Past Seminars
Thu Jan 14 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Tue Jan 12 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Jan 11 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jan 11 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Thu Jan 07 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Tue Jan 05 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Jan 04 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jan 04 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Thu Dec 31 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Tue Dec 29 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Dec 28 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Dec 28 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Thu Dec 24 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Tue Dec 22 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Dec 21 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Dec 21 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Dec 21 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Mon Dec 21 
Math Biology Seminar12:00pm  Via ZoomExploring the predictive abilities of a mathematical model of cancer immunotherapy Jana Gevertz, The College of New Jersey Abstract:Mathematical models of biological systems are often validated by fitting to the average behavior in an often small experimental dataset. Here we ask the question of whether mathematical predictions for the average are actually applicable in samples that deviate from the average. We will explore this in the context of a mouse model of melanoma treated with two forms of immunotherapy: immunemodulating oncolytic viruses and dendritic cell injections. We will demonstrate how a mathematically optimal protocol for treating the average mouse can lack robustness, meaning the best treatment for the average can fail to be optimal (and in fact, can be far from optimal) in mice that differ from the average. We also show how mathematics can be used to identify an optimal treatment protocol that is robust to perturbations from the average. Time permitting, we will also explore how robustness influences the personalization of treatment protocols for individual mice.Zoom details:Join Zoom Meeting https://umn.zoom.us/j/94817303643?pwd=aHBrNFpzaFdLSU9HUjJybllla3M3QT09 Meeting ID: 948 1730 3643 Passcode: R90eZ8 
Fri Dec 18 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847Combinatorics and Commutative Algebra Abstract:See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Fri Dec 18 
MathCEP Seminar10:10am  ZoomMathCEP Seminar 
Thu Dec 17 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Dec 16 
PDE Seminar3:35pm  Via ZoomPDE Seminar 
Tue Dec 15 
IMA Data Science Lab Seminar1:25pm  OnlineEstimation of Manifolds from Point Clouds: Building Models from Data Barak Sober, Duke University Abstract:A common observation in datadriven applications is that high dimensional data has a low intrinsic dimension, at least locally. Thus, when one wishes to work with data that is not governed by a clear set of equations, but still wishes to perform statistical or other scientific analysis, an optional model is the assumption of an underlying manifold from which the data was sampled. This manifold is not given explicitly but we can obtain samples of it (i.e., the individual data points). In this talk, we will consider the mathematical problem of estimating manifolds from a finite set of samples, possibly recorded with noise. Using a Manifold Moving LeastSquares approach we provide an approximant manifold with high approximation order in both the Hausdorff sense as well as in the Riemannian metric (i.e., a nearly isometry). In the case of bounded noise, we present an algorithm that is guaranteed to converge in probability when the number of samples tends to infinity. The motivation for this work is based on the analysis of the evolution of shapes through time (e.g., handwriting or primates' teeth) and we will show how this framework can be utilized to answer scientific questions in paleontology and archaeology. I am currently privileged to be working with Prof. Ingrid Daubechies. Before that, I completed my PhD in applied mathematics at TelAviv University under the mentoring of Professor David Levin. My MSc was comentored by Professor. Levin and Professor Israel Finkelstein from the Department of Archaeology and Ancient Near Eastern Civilizations. My research ranges between analysis of high dimensional data from a geometrical perspective and the application of mathematical and statistical methods in digital humanities. 
Tue Dec 15 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Dec 14 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Dec 14 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Dec 14 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Mon Dec 14 
Math Biology Seminar12:00pm  Via ZoomModelling collective cell migration in neural crest Philip Maini, Oxford Abstract:A very common phenomenon in biology and ecology isthe collective movement of individuals, whether thesebe birds, fish, cells, etc. This leads to the general question: Whatare the hallmarks of collective movement?In this talk, I will review an interdisciplinary study we have been carrying out over the past decade on a powerful model paradigm for collective cell migration, namely, the chick cranial neural crest. I will show how a relatively simple multiscale hybrid cellular automaton model, combined with experimental studies, can lead to new insights into the phenomenon of collective cell migration.Zoom details:Join Zoom Meeting https://umn.zoom.us/j/94817303643?pwd=aHBrNFpzaFdLSU9HUjJybllla3M3QT09 Meeting ID: 948 1730 3643 Passcode: R90eZ8 
Mon Dec 14 
Special Events and Seminars11:00am  https://umn.zoom.us/j/91913586177HAGMTPDE Seminar Alejandra Gaitán Montejo, Purdue University, Indiana 
Fri Dec 11 
IMA/MCIM Industrial Problems Seminar1:25pm  ZoomCOVID Modeling: Testing Scenarios and Geographical Networks Natalie Sheils, UnitedHealth Group Abstract:Compartmental models for epidemiological modeling are a classic tool. In this talk I will share work we did to understand the effects of various testing strategies using a straightforward SIR model. I will also cover an extension to the typical SIR model to account for geographic heterogeneity and the incorporation of mobility data. Natalie Sheils is a research scientist at UnitedHealth Group Research and Development. She earned her PhD in Applied Mathematics from the University of Washington in 2015 and then completed a postdoctoral fellowship at the University of Minnesota School of Mathematics. Her current research includes disease modeling and applications of healthcare data. She is involved in scientific policy and previously served on the SIAM Committee on Science Policy (20182019) and is now on the AMS Committee on Science Policy (20212024). 
Fri Dec 11 
MathCEP Seminar10:10am  ZoomMathCEP Seminar 
Fri Dec 11 
Combinatorics Seminar9:00am  Zoom ID is 94127949847Blowup algebras of sparse determinantal varieties Elisa Gorla , University of Neuchâtel Abstract:Let X be a sparse generic matrix, i.e. a matrix whose entries are either zeros or distinct variables. A sparse determinantal variety is the locus where X does not have full rank. While determinantal varieties, i.e. degeneracy loci of matrices whose entries are distinct variables with no zeros, are in many respects wellunderstood, this is not yet the case for sparse determinantal varieties. However, sparse determinantal varieties have recently received increased attention, as new approaches for studying them have been introduced by Boocher (2011) and subsequently in a series of works by Conca, De Negri and myself (20152020). Blowup algebras  such as the Rees algebra, the special fiber ring, and the associated graded ring  are an active area of study within commutative algebra. They are algebraic objects related to the concept of blowing up a variety along a subvariety. In this talk, I will present some new results on the Rees algebra and the fiber ring of sparse determinantal varieties. Our approach makes an essential use of the theory of SAGBI bases, which I will introduce during the talk. The new results that I will present are part of a joint work with E. Celikbas, E. Dufresne, L. Fouli, K.N. Lin, C. Polini, and I. Swanson, which was started during the collaborative conference WICA  Women in Commutative Algebra.See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Thu Dec 10 
Colloquium3:30pm  Via Zoom ID 91514486597 (contact faculty for pw)The Dehn complex: scissors congruence, Ktheory, and regulators Inna Zakharevich, Cornell University Abstract:Hilbert's third problem asks: do there exist two polyhedra with the same volume which are not scissors congruent? In other words, if $P$ and $Q$ are polyhedra with the same volume, is it always possible to write $P = \bigcup_{i=1}^n P_i$ and $Q = \bigcup_{i=1}^nQ_i$ such that the $P$'s and $Q$'s intersect only on the boundaries and such that $P_i \cong Q_i$? In 1901 Dehn answered this question in the negative by constructing a second scissors congruence invariant now called the "Dehn invariant," and showing that a cube and a regular tetrahedron never have equal Dehn invariants, regardless of their volumes. We can then restate Hilbert's third problem: do the volume and Dehn invariant separate the scissors congruence classes? In 1965 Sydler showed that the answer is yes; in 1968 Jessen showed that this result extends to dimension 4, and in 1982 Dupont and Sah constructed analogs of such results in spherical and hyperbolic geometries. However, the problem remains open past dimension 4. By iterating Dehn invariants Goncharov constructed a chain complex, and conjectured that the homology of this chain complex is related to certain graded portions of the algebraic Ktheory of the complex numbers, with the volume appearing as a regulator. In joint work with Jonathan Campbell, we have constructed a new analysis of this chain complex which illuminates the connection between the Dehn complex and algebraic Ktheory, and which opens new routes for extending Dehn's results to higher dimensions. In this talk we will discuss this construction and its connections to both algebraic and Hermitian Ktheory, and discuss the new avenues of attack that this presents for the generalized Hilbert's third problem. 
Thu Dec 10 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Dec 09 
Probability Seminar4:00pm  Via ZoomOn the extension complexity of random polytopes Lisa Sauermann, IAS Abstract:Sometimes, it is possible to represent a complicated polytope as a projection of a much simpler polytope. To quantify this phenomenon, the extension complexity of a polytope P is defined to be the minimum number of facets in a (possibly higherdimensional) polytope from which P can be obtained as a (linear) projection. In this talk, we discuss some results on the extension complexity of random polytopes. For a fixed dimension d, we consider random ddimensional polytopes obtained as the convex hull of independent random points either in the unit ball or on the unit sphere. In both cases, we prove that the extension complexity is typically on the order of the square root of number of vertices of the polytope. Joint work with Matthew Kwan and Yufei Zhao 
Wed Dec 09 
PDE Seminar3:35pm  Via ZoomPDE Seminar 
Tue Dec 08 
Dynamical Systems2:30pm  Via ZoomDynamical Systems Seminar 
Tue Dec 08 
IMA Data Science Lab Seminar1:25pm  ZoomUnderstanding Convolutional Neural Networks Through Signal Processing Matthew Hirn, Michigan State University Abstract:Convolutional neural networks (CNNs) are the goto tool for signal processing tasks in machine learning. But how and why do they work so well? Using the basic guiding principles of CNNs, namely their convolutional structure, invariance properties, and multiscale nature, we will discuss how the CNN architecture arises as a natural biproduct of these principles using the language of nonlinear signal processing. In doing so we will extract some core ideas that allow us to apply these types of algorithms in various contexts, including the multireference alignment inverse problem, generative models for textures, and supervised machine learning for quantum many particle systems. Time permitting, we will also discuss how these core ideas can be used to generalize CNNs to manifolds and graphs, while still being able to provide mathematical guarantees on the nature of the representation provided by these tools. Matthew Hirn is an Associate Professor in the Department of Computational Mathematics, Science & Engineering and the Department of Mathematics at Michigan State University. At Michigan State he is the scientific leader of the ComplEx Data Analysis Research (CEDAR) team, which develops new tools in computational harmonic analysis, machine learning, and data science for the analysis of complex, high dimensional data. Hirn received his B.A. in Mathematics from Cornell University and his Ph.D. in Mathematics from the University of Maryland, College Park. Before arriving at MSU, he held postdoctoral appointments in the Applied Math Program at Yale University and in the Department of Computer Science at Ecole Normale Superieure, Paris. He is the recipient of the Alfred P. Sloan Fellowship (2016), the DARPA Young Faculty Award (2016), the DARPA Director’s Fellowship (2018), and the NSF CAREER award (2019), and was designated a Kavli Fellow by the National Academy of Sciences (2017). 
Tue Dec 08 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Dec 07 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Dec 07 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Dec 07 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Mon Dec 07 
Math Biology Seminar12:00pm  Via ZoomMathematical model of colorectal cancer initiation Ivana Bozic, University of Washington Abstract:Cancer evolution cannot be observed directly in patients, and new methodologies are needed for obtaining a quantitative understanding of this obscure process. We developed and analyzed a stochastic model of malignant transformation in the colon that precisely quantifies the process of colorectal carcinogenesis in patients through loss of tumor suppressors APC and TP53 and gain of the KRAS oncogene. Our study employs experimentally measured mutation rates in the colon and growth advantages provided by driver mutations. We calculate the probability of a colorectal malignancy, the sizes of premalignant lesions, and the order of acquisition of driver mutations during colorectal tumor evolution. We demonstrate that the order of driver events in colorectal cancer is determined primarily by the fitness effects that they provide, rather than their mutation rates. Link to Paper.Zoom details:Join Zoom Meeting https://umn.zoom.us/j/94817303643?pwd=aHBrNFpzaFdLSU9HUjJybllla3M3QT09 Meeting ID: 948 1730 3643 Passcode: R90eZ8 
Mon Dec 07 
Special Events and Seminars11:00am  https://umn.zoom.us/j/98551414461HAGMTPDE Seminar Li Chen, Massachusetts Institute of Technology, Massachusetts 
Fri Dec 04 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847Combinatorics and Commutative Algebra Abstract:See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Fri Dec 04 
IMA/MCIM Industrial Problems Seminar1:25pm  ZoomDigital Health Technology for Heart Failure Diagnostic Monitoring Julie Thompson, Boston Scientific Abstract:I will describe my experience working in the area of algorithm development for implantable medical devices designed to improve heart failure patient management. Signs and symptoms have been the hallmark of clinical assessment of heart failure (HF) patients. Current HF management takes a reactive approach, relying on patients recognizing symptoms and seeking help. However, patients often do not recognize their symptoms, resulting in late identification of a worsening condition which often results in hospitalization. HeartLogic™ monitors patients’ HF status by assessing objective information from multiple physiological trends that are associated with common signs and symptoms of HF. HeartLogic fuses information from individual trends into a single diagnostic index and alerts clinicians when the patient’s condition changes in the worsening direction, enabling more timely ambulatory remote patient management. HeartLogic is the first and only FDA approved Heart Failure Diagnostic in implantable cardiac therapy devices with remote alert capability. Julie is an R&D Director at Boston Scientific Corporation where she leads a team of scientists and engineers focused on developing diagnostic and therapy technology for improved cardiac patient management. Julie joined Boston Scientific (previously Guidant Corporation) in 2001 after completing her PhD in electrical engineering at the University of Michigan. She began her career as a research scientist focused on tachyarrhythmia algorithms, and subsequently transitioned to research management roles. In 2005 Julie took on leadership of a team focused on developing diagnostic technology for heart failure monitoring. She led this group through research and design of multiple diagnostic features that have been commercialized, including a novel multisensor diagnostic monitoring technology, HeartLogic™, proven to effectively detect early signs of worsening heart failure in patients indicated for an implantable cardiac rhythm management therapy device. 
Fri Dec 04 
MathCEP Seminar10:10am  ZoomMathCEP Seminar 
Thu Dec 03 
Colloquium3:30pm  Via Zoom ID 91514486597 (contact faculty for pw)Shock formation and vorticity creation for compressible Euler Vlad Vicol, Courant Institute of Mathematical Sciences, New York University Abstract:We discuss the formation of singularities (shocks) for the compressible Euler equations with the ideal gas law. We provide a constructive proof of stable shock formation from smooth initial datum, of finite energy, and with no vacuum regions. Via modulated selfsimilar variables, the blowup time and location can be explicitly computed, the geometry of the shock set can be understood, and at the blowup time the solutions can be shown to have precisely Holder 1/3 regularity. Additionally, for the nonisentropic problem we show that sound waves interact with entropy waves to produce vorticity at the shock. This talk is based on joint work with Tristan Buckmaster and Steve Shkoller. 
Thu Dec 03 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Dec 02 
PDE Seminar3:35pm  Via ZoomPDE Seminar 
Wed Dec 02 
Probability Seminar9:00am  Via ZoomSome properties of the discrete membrane model Alessandra Cipriani, UT Delft Abstract:The discrete membrane model (MM) is a random interface model for separating surfaces that tend to preserve curvature. It is a very close relative of the discrete Gaussian free field (DGFF), for which instead the most likely interfaces are those preserving the mean height. However working with the two models presents some key differences, in that in the MM the shape is driven by the biharmonic operator, while the DGFF is essentially a Gaussian perturbation of harmonic functions. In particular, a lot of tools (electrical networks, random walk representation of the covariance) are available for the DGFF and lack in the MM. In this talk we will review some basic properties of the MM, and we will investigate a random walk representation for the covariances of the MM and what it can bring forth in terms of scaling limits of its extremes. This talk is based on joint works, partly ongoing, with Biltu Dan, Rajat Subhra Hazra (ISI Kolkata) and Rounak Ray (TU/e). 
Tue Dec 01 
Colloquium3:30pm  Via Zoom ID 91514486597 (contact faculty for pw)Galois symmetries of the stable homology of integer symplectic groups Akshay Venkatesh, Institute for Advanced Study Abstract:There are many natural sequences of moduli spaces in algebraic geometry whose homology approaches a "limit", despite the fact that the spaces themselves have growing dimension. If these moduli spaces are defined over a field K, this limiting homology carries an extra structure  an action of the Galois group of K  which is arithmetically interesting. In joint work with Feng and Galatius, we compute this action (or rather a slight variant) in the case of the moduli space of abelian varieties. I will explain the answer and why I find it interesting. No familiarity with abelian varieties will be assumed  I will emphasize topology over algebraic geometry. 
Tue Dec 01 
Dynamical Systems2:30pm  Via ZoomDynamical Systems Seminar 
Tue Dec 01 
IMA Data Science Lab Seminar1:25pm  ZoomFilterdecomposed Convolution in Deep Neural Networks: On Groups, Graphs, and Across Domains Xiuyuan Cheng, Duke University Abstract:Deep convolutional neural networks (CNN) have been developed and applied to data on Euclidean domains as well as nonEuclidean ones. In this talk, we introduce a framework of decomposing convolutional filters over a truncated set of basis filters, which applies to the standard CNN, groupequivariant CNN, as well as convolution on graphs. The basis decomposition reduces the model and computational complexity of deep CNNs with an automatically imposed filter regularity. First, for group equivariant CNNs, a joint basis decomposition over space and group geometry achieves group equivariance in image data, including rotation and scaling groups, with provable representation stability with respect to the geometric deformation of input data. Second, the decomposed convolution on graphs provides a unified framework for several graph convolution models. The graph convolution with lowrank local filters has enlarged expressiveness to represent graph signals than spectral graph convolutions, and shows empirical advantage on facial expression and action recognition datasets. At last, when allowing the lightweighted basis layer to be adapted to varying modals in data, the decomposition also provides a new way of invariant feature learning across domains, as well as conditional image generation. Joint work with Qiang Qiu, Ze Wang, Zichen Miao, Wei Zhu, Robert Calderbank, and Guillermo Sapiro. Xiuyuan Cheng is an assistant professor of mathematics at Duke University. Dr. Cheng is interested in theoretical and computational problems in highdimensional data analysis and machine learning, particularly on spectral methods, kernel matrices, and neural networks. Dr. Cheng's work is supported by NSF, NIH, and the Alfred P. Sloan Foundation.

Tue Dec 01 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Nov 30 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Nov 30 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Nov 30 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Mon Nov 30 
Math Biology Seminar12:00pm  Via ZoomStability problems arising in biologically motivated PDEs Zoi Rapti, University of Illinois Abstract:In many biological models, including epidemic models for cholera and rabies and predatorprey models, the diffusivity properties of the various compartments may vary. In this work, we focus on situations where the mathematical model contains one diffusing compartment (PDE) that is coupled with other compartments that are modeled by ODEs. When studying the linear stability of steady states, one ends up with rational eigenvalue problems. The difficulty with these problems, from the point of view of both analysis and numerical experimentation, is that one has no apriori information as to where the spectrum of the problem might lie. Here, we show that a number of the properties of selfadjoint eigenvalue problems (including the reality of the spectrum) carry over to the operators considered in this work. Our analysis is based on the theory of Herglotz functions. Concrete applications will be demonstrated in models of rabies infection in fox populations, plantherbivore interactions and morphogen diffusion.Zoom details:Join Zoom Meeting https://umn.zoom.us/j/94817303643?pwd=aHBrNFpzaFdLSU9HUjJybllla3M3QT09 Meeting ID: 948 1730 3643 Passcode: R90eZ8 
Mon Nov 30 
Special Events and Seminars11:00am  https://umn.zoom.us/j/92939569770HAGMTPDE Seminar John Hoffman, University of Missouri, Missouri 
Fri Nov 27 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847Combinatorics and Commutative Algebra Abstract:See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Fri Nov 27 
MathCEP Seminar10:10am  ZoomMathCEP Seminar 
Thu Nov 26 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Nov 25 
Probability Seminar4:00pm  Via ZoomNUUMN Joint Probability Seminar 
Wed Nov 25 
PDE Seminar3:35pm  Via ZoomPDE Seminar 
Tue Nov 24 
Dynamical Systems2:30pm  Via ZoomDynamical Systems Seminar 
Tue Nov 24 
IMA Data Science Lab Seminar1:25pm  OnlineMultiway Tensor Analysis with Neuroscience Applications Gal Mishne, University of California, San Diego Abstract:Experimental advances in neuroscience enable the acquisition of increasingly largescale, highdimensional and highresolution neuronal and behavioral datasets, however addressing the full spatiotemporal complexity of these datasets poses significant challenges for data analysis and modeling. We propose to model such datasets as multiway tensors with an underlying graph structure along each mode, learned from the data. In this talk I will present three frameworks we have developed to model, analyze and organize tensor data that infer the coupled multiscale structure of the data, reveal latent variables and visualize short and longterm temporal dynamics with applications in calcium imaging analysis, fMRI and artificial neural networks.Gal is an assistant professor in the Hal?c?o?lu Data Science Institute (HDSI) at UC San Diego, and affiliated with the ECE department and the Neurosciences Graduate program. I am part of the Neurotheory Network. Before arriving at UCSD, I was a Gibbs Assistant Professor in the Applied Math program at Yale University, with Prof. Ronald Coifman's research group. I completed my PhD in 2017 at the Technion at the Faculty of Electrical Engineering under the supervision of Prof. Israel Cohen. 
Tue Nov 24 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Nov 23 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Nov 23 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Nov 23 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Mon Nov 23 
Math Biology Seminar12:00pm  Via ZoomMagic, Gandhi, and balding: matrix methods for stochastic dynamic programming Jody Reimer, University of Utah Abstract:What unites all of the things listed in this title? You'll have to show up to find out. This work is based on the concept of tradeoffs, a central idea in ecology and evolutionary biology. For example, the evolution of life history strategies is often framed in the language of tradeoffs. Behavioural ecologists may be interested in the tradeoffs inherent in the allocation of time (e.g., between foraging and vigilance) and resources (e.g., how much energy to invest in a reproductive attempt). Conservationists and wildlife managers must also consider tradeoffs between cost, political pressures, and management goals. Stochastic dynamic programming (SDP) is a powerful and flexible method for exploring optimal tradeoffs and has been used in a broad range of applications. In the last 30 years, concomitant with the development of SDP methods in ecology and evolution, matrix methods have emerged as another powerful tool for analyzing ecological systems. I will discuss how reformulating SDP problems in matrix notation allows us to propose a novel matrix method for solving SDP models, using intuition familiar to mathematical ecologists from matrix population models. Zoom details:Join Zoom Meeting https://umn.zoom.us/j/94817303643?pwd=aHBrNFpzaFdLSU9HUjJybllla3M3QT09 Meeting ID: 948 1730 3643 Passcode: R90eZ8 
Mon Nov 23 
Special Events and Seminars11:00am  https://umn.zoom.us/j/95070384420HAGMTPDE Seminar Liding Yao, University of WisconsinMadison, Madison 
Fri Nov 20 
MCFAM Seminar7:30pm  Zoom: https://umn.zoom.us/j/99433158383?pwd=T3h6Dynamic Shrinkage Processes David Matteson, Cornell Abstract:We propose a novel class of dynamic shrinkage processes for Bayesian time series and regression analysis. Building on a globallocal framework of prior construction, in which continuous scale mixtures of Gaussian distributions are employed for both desirable shrinkage properties and computational tractability, we model dependence between the local scale parameters. The resulting processes inherit the desirable shrinkage behaviour of popular globallocal priors, such as the horseshoe prior, but provide additional localized adaptivity, which is important for modelling time series data or regression functions with local features. We construct a computationally efficient Gibbs sampling algorithm based on a Pólyagamma scale mixture representation of the process proposed. Using dynamic shrinkage processes, we develop a Bayesian trend filtering model that produces more accurate estimates and tighter posterior credible intervals than do competing methods, and we apply the model for irregular curve fitting of minute?by?minute Twitter central processor unit usage data. In addition, we develop an adaptive time varying parameter regression model to assess the efficacy of the FamaFrench five?factor asset pricing model with momentum added as a sixth factor. Our dynamic analysis of manufacturing and healthcare industry data shows that, with the exception of the market risk, no other risk factors are significant except for brief periods. If time permits, we will also highlight extensions to change point analysis and adaptive outlier detection. Bio: David S. Matteson is Associate Professor of Statistics and Data Science at Cornell University, where he is a member of the ILR School, Computing and Information Science, the Center for Applied Mathematics, the Field of Operations Research, and the Program in Financial Engineering, and teaches statistics, data science, and financial engineering courses. Professor Matteson received his PhD in Statistics at the University of Chicago (2008) and his BSB in Finance, Mathematics, and Statistics at the University of Minnesota (2003). He received a CAREER Award from the National Science Foundation. He is currently an Associate Editor of the Journal of the American Statistical AssociationTheory and Methods, The American Statistician, and Statistica Sinica. He is an elected officer for the Business and Economic Statistics Section of the American Statistical Association. He is coauthor of `Statistics and Data Analysis for 
Fri Nov 20 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847Strange Expectations for Simultaneous Cores Eric Stucky, Abstract:"bcores" are a class of partitions that originally arose in the modular representation theory of the symmetric group; partitions that are simultaneously a and bcores are called (a,b)cores. We discuss a Coxeter formulation of (a,b)cores due to Williams and Thiel that allows us to define "(W,b)cores" for any Weyl group W, as well as a quadratic form size that in type A counts the number of boxes in the Young diagram. In their original paper they used Ehrhart theory, as well as the "strange formula" of Freudenthal and de Vries, to compute the expected size of a (W,b)core for simplylaced W. This talk is based on recent work with Williams and Thiel that reinterprets the story from their original paper somewhat to extend their results to all Weyl groups.See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Fri Nov 20 
MathCEP Seminar10:10am  ZoomMathCEP Seminar 
Thu Nov 19 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Thu Nov 19 
Colloquium10:00am  Via Zoom ID 91514486597 (contact faculty for pw)On the Ramanujan conjecture and its generalisations Ana Caraiani, Imperial College London Abstract:In 1916, Ramanujan made a conjecture that can be stated in completely elementary terms: he predicted an upper bound on the coefficients of a power series obtained by expanding a certain infinite product. In this talk, I will discuss a more sophisticated interpretation of this conjecture, via the Fourier coefficients of a highly symmetric function known as a modular form. I will give a hint of the idea in Deligne's proof of the conjecture in the 1970's, who related it to the arithmetic geometry of smooth projective varieties over finite fields. Finally, I will discuss generalisations of this conjecture and some recent progress on these using the machinery of the Langlands program. The last part is based on joint work with Allen, Calegari, Gee, Helm, Le Hung, Newton, Scholze, Taylor, and Thorne. 
Wed Nov 18 
PDE Seminar3:35pm  Via ZoomSingularity formation in incompressible fluids and related models Jiajie Chen , Caltech Abstract:In this talk, we will discuss the selfsimilar singularity formation in the HouLuo (HL) model for the 3D asymmetric Euler equations with boundary. Several observations obtained in the analysis of the HL model have been used to study other equations. We will also talk about some features of the singularity formation in the 2D Boussinesq and 3D asymmetric Euler equations with $C^{\alpha}$ velocity and boundary that have connections to the HouLuos computation for the potential 3D Euler singularity. Some of the results are joint with Tom Hou and De Huang. Join Zoom Meetinghttps://umn.zoom.us/j/91765959125?pwd=RjRkSW9PNi9HNzVOb2lwb0tkWVVoZz09Meeting ID: 917 6595 9125Passcode: VinH16 
Wed Nov 18 
Probability Seminar9:00am  Via ZoomQuantitative estimates for the effect of disorder on lowdimensional lattice systems Ron Peled, Tel Aviv University Abstract:The addition of an arbitrarily weak random field to lowdimensional classical statistical physics models leads to the "rounding" of firstorder phase transitions at all temperatures, as predicted in 1975 by Imry and Ma and proved rigorously in 1989 by Aizenman and Wehr. This phenomenon was recently quantified for the twodimensional randomfield Ising model (RFIM), proving that it exhibits exponential decay of correlations at all temperatures. The RFIM analysis relies on monotonicity (FKG) properties which are absent in many other classical models. The talk will present new results on the quantitative aspects of the phenomenon for general systems with discrete and continuous symmetries, including Potts, spin O(n), spin glass and height function models. 
Tue Nov 17 
Dynamical Systems2:30pm  Via Zoom See abstractDynamics of curved travelling fronts on a twodimensional lattice Mia Jukic, Leiden University Abstract:In this talk I will introduce the AllenCahn lattice differential equation (LDE) posed on a two dimensional lattice. It is a wellknown result that this equation admits a traveling wave solution. In the first part, I will explain the most interesting differences between the traveling waves arising from PDEs and the traveling waves arising from LDEs, such as dependence of the wave profile and the wave speed on the direction of propagation. In the second part, I will present recent results on the stability of the traveling wave solutions propagating in rational directions, and show a connection between the solution of a discrete mean curvature flow with a drift term and the evolution of the interface region of a solution that starts as a bounded perturbation to the wave profile.Zoom Link: https://umn.zoom.us/meeting/register/tJ0lcCsrjIqHN1xLgljWWlDIYBIUwKwJK 
Tue Nov 17 
IMA Data Science Lab Seminar1:25pm  ZoomFast Statistical and Geometric Distances Between Families of Distributions Alexander Cloninger, University of California, San Diego Abstract:Detecting differences and building classifiers between a family of distributions, given only finite samples, has had renewed interest due to data science applications in high dimensions. Applications include survey response effects, topic modeling, and various measurements of cell or gene populations per person. Recent advances have focused on kernel Maximum Mean Discrepancy and Optimal Transport. However, when the family of distributions are concentrated near a low dimensional structure, or when the family of distributions being considered is generated from a family of simple group actions, these algorithms fail to exploit the reduced complexity. In this talk, we'll discuss the theoretical and computational advancements that can be made under these assumptions, and their connections to harmonic analysis, approximation theory, and group actions. Similarly, we'll use both techniques to develop methods of provably identifying not just how much the distributions deviate, but where these differences are concentrated. We'll also focus on applications in medicine, generative modeling, and supervised learning. Alex Cloninger is an Assistant Professor in Mathematics and the Hal?c?o?lu Data Science Institute at UC San Diego. He received his PhD in Applied Mathematics and Scientific Computation from the University of Maryland in 2014, and was then an NSF Postdoc and Gibbs Assistant Professor of Mathematics at Yale University until 2017, when he joined UCSD. Alex researches problems in the area of geometric data analysis and applied harmonic analysis. He focuses on approaches that model the data as being locally lower dimensional, including data concentrated near manifolds or subspaces. These types of problems arise in a number of scientific disciplines, including imaging, medicine, and artificial intelligence, and the techniques developed relate to a number of machine learning and statistical algorithms, including deep learning, network analysis, and measuring distances between probability distributions. 
Tue Nov 17 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Nov 16 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Nov 16 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Nov 16 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Mon Nov 16 
Math Biology Seminar12:00pm  Via ZoomThe four Cs of nonlinear network pandemic modelling: Covid19, Causality, Clustering, and Canada. Alain Goriely, Oxford Abstract:The spreading of infectious diseases including COVID19 depends on human interactions. In an environment where behavioral patterns and physical contacts are constantly evolving according to new governmental regulations, measuring these interactions is a major challenge. Mobility has emerged as an indicator for human activity and, implicitly, for human interactions. Here, I will study the coupling between mobility and COVID19 dynamics and show that variations in global air traffic and local driving mobility can be used to stratify different disease phases. I will show how local mobility can serve as a quantitative metric to estimate future reproduction numbers and identify the stages of the pandemic when mobility and reproduction become decorrelated. Moreover, we can fully understand the early spread of the disease through network modelling. I will show how an application of these ideas to the province of Newfoundland ended up in front of their Supreme Court and how it helped them controlled the disease. This is joint work with Kevin Linka and Ellen Kuhl at Stanford.Zoom details:Join Zoom Meeting https://umn.zoom.us/j/94817303643?pwd=aHBrNFpzaFdLSU9HUjJybllla3M3QT09 Meeting ID: 948 1730 3643 Passcode: R90eZ8 
Mon Nov 16 
Special Events and Seminars11:00am  https://umn.zoom.us/j/92810167937HAGMTPDE Seminar Zanbing Dai, University of Minnesota, Minnesota 
Fri Nov 13 
IMA/MCIM Industrial Problems Seminar1:25pm  ZoomThe Evolution of Basketball with Data Science Ivana Seric, Philadelphia 76ers Abstract:For the last couple of decades, most industries have grown to take advantage of the information gained from data collection. As that happened, professional sports teams started to catch on. Baseball took the lead thanks to the amount of data collected over the years, which dates to the 1800s, but a lot of other professional sports followed and put more attention to their data collection. With technological advancements, particularly highspeed cameras, storage capacities and image recognition, more dynamic sports started to collect richer and richer data. The insights derived from this data started shifting the way the game is played and the way players are evaluated. This talk will take you through the evolution of data science in basketball and give examples of how data is shifting the way teams make decisions on and off the court. Some bio bullet points:

Fri Nov 13 
MathCEP Seminar10:10am  ZoomMathCEP Seminar 
Fri Nov 13 
Combinatorics Seminar9:00am  Zoom ID is 94127949847Free resolutions of function classes via order complexes Justin Chen, Georgia Tech Abstract:Function classes are collections of Boolean functions on a finite set. In 2017, a method of studying function classes via commutative algebra, by associating a squarefree monomial ideal to a function class, was introduced by Yang. I will describe this connection, as well as some free resolutions and Betti numbers for these ideals for an interesting collection of function classes, corresponding to intersectionclosed posets. This is joint work with Chris Eur, Greg Yang, and Mengyuan Zhang.See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Thu Nov 12 
Colloquium3:30pm  Via Zoom ID 91514486597 (contact faculty for pw)Small scale creation and singularity formation in fluid mechanics Alexander Kiselev, Duke University Abstract:The Euler equation describing motion of ideal fluid goes back to 1755. The analysis of the equation is challenging since it is nonlinear and nonlocal. Its solutions are often unstable and spontaneously generate small scales. The fundamental question of global regularity vs finite time singularity formation remains open for the Euler equation in three spatial dimensions. In this lecture, I will review the history of this question and its potential connection with the arguably greatest unsolved problem of classical physics, turbulence. Results on small scale and singularity formation in two dimensions and for a number of related models will also be presented. 
Thu Nov 12 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Nov 11 
Probability Seminar4:00pm  Via ZoomNUUMN Joint Probability Seminar 
Wed Nov 11 
PDE Seminar3:35pm  Via ZoomA Harnack inequality for weak solutions of nonelliptic equations Max Goering, University of WashingtonSeattle Abstract:We'll introduce a broad class of PDEs which arise from the Calculus of Variations. After producing specific examples of some PDEs that fall within this class, we will outline a Moser Iteration based argument to derive a harnack inequality for weak solutions. This demonstrates that for 0th order regularity, the aspect of "ellipticity" which is useful is the fixed homogeneity. This raises the question of whether or not some notion of convexity can be used to replace ellipticity and still recover 1st order regularity of solutions. 
Tue Nov 10 
Dynamical Systems2:30pm  Via ZoomDynamical Systems Seminar 
Tue Nov 10 
IMA Data Science Lab Seminar1:25pm  ZoomNatural Graph Wavelet Packets Naoki Saito, University of California, Davis Abstract:I will discuss how to build a smooth multiscale wavelet packet dictionary for graph signal processing. Our approach utilizes the dual geometry of an input graph organized by new nontrivial eigenvector distances. More precisely, we construct a dual graph where each node represents a Laplacian eigenvector of the input graph and each weight is an affinity measure between the corresponding pair of the graph Laplacian eigenvectors, which is typically the inverse of the nontrivial distance between them. Once such a dual graph is formed, we bipartition the dual graph and construct tree structured subspaces. Finally, we generate smooth localized wavelet packet vectors (and the expansion coefficients of an input graph signal) on each such subspace that corresponds to a collection of the graph Laplacian eigenvectors. This can be viewed as a graph version of the "Shannon" wavelet packet dictionary. Using the bestbasis algorithm or its variants on this graph wavelet packet dictionary, one can select a graph orthonormal basis suitable for a given task such as efficient approximation, denoising, classification. This is joint work with Alex Cloninger (UC San Diego) and Haotian Li (UC Davis). Naoki Saito is an applied and computational harmonic analyst who is interested in feature extraction, graph signal processing, Laplacian eigenfunctions, and human and machine perception. He received the B.Eng. and the M.Eng. degrees in mathematical engineering from the University of Tokyo, Japan, in 1982 and 1984, respectively. Then, he received his Ph.D. degree in applied mathematics from Yale in 1994 while working at the Schlumberger Doll Research. In 1997, he joined the Department of Mathematics at the University of California, Davis, where he is currently a professor and a director of the UC Davis TETRAPODS Institute of Data Science (UCD4IDS), one of the NSF's Transdisciplinary Research In Principles Of Data Science (TRIPODS) Institutes that bring together the theoretical computer science, electrical engineering, mathematics, and statistics communities to develop the theoretical foundations of data science. Dr. Saito received the Best Paper Awards from SPIE (1994) and JSIAM (2016) as well as the Henri Doll Award from Schl 
Tue Nov 10 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Nov 09 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Nov 09 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Nov 09 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Mon Nov 09 
Math Biology Seminar12:00pm  Via ZoomMechanics of Cell Packing in the Notochord Sharon Lubkin, North Carolina State University Abstract:The notochord, the defining feature of chordates, is essentially a soft cylinder patterned in early development by a small number of interior cells. Our analysis of packing patterns of vacuolated cells in zebrafish notochords reveals that the characteristic "staircase" pattern, or the alternate patterns observed in mutants, are governed by a simple and robust geometric measure. We have also noted that the notochord is weakly elliptical in cross section. From these observations, and from similar observations in a model gel system, we have identified a bidirectional interaction between cell packing pattern and the cross section of the surrounding tube. We model the mechanics of the notochord tube three ways, identifying a second key nondimensional ratio governing the pattern formation, and revealing previously unobserved packing patterns. Zoom details:Join Zoom Meeting https://umn.zoom.us/j/94817303643?pwd=aHBrNFpzaFdLSU9HUjJybllla3M3QT09 Meeting ID: 948 1730 3643 Passcode: R90eZ8 
Mon Nov 09 
Special Events and Seminars11:00am  https://umn.zoom.us/j/92347592510HAGMTPDE Seminar Joseph Feneuil, Australian National University, Australia 
Fri Nov 06 
MCFAM Seminar7:30pm  Zoom: https://umn.zoom.us/j/99433158383?pwd=T3h6A Cluster Analysis Application Using only Social Determinant Variables to Predict Profiles of US Adults having the Highest Health Expenditures Margie Rosenberg, University of Wisconsin  Madison Abstract:AttachedBio: Margie Rosenberg, PhD, FSA is the Assurant Health Professor of Actuarial Science Professor at the University of WisconsinMadison. Margies research interests are in the application of statistical methods to health care, and applying her actuarial expertise to cost and policy issues in health care. Her recent research involves linking social determinants to outcomes such as (i) assessing the impact of delayed attention to oral health issues on emergency department visits and (ii) assessing the impact of unhealthy behaviors on perceived health status and predicting individuals with persistent high expenditures. Prior to her starting on her academic career, Margie worked as a life actuary for Allstate Life Insurance Company in Northbrook, IL.Zoom Link: https://umn.zoom.us/j/99433158383?pwd=T3h6LzlTWCt4YW93Kzk3Rmg2bXQrZz09 
Fri Nov 06 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847Gröbner geometry of Schubert polynomials through ice Anna Weigandt Abstract:The geometric naturality of Schubert polynomials and the related combinatorics of pipe dreams was established by Knutson and Miller (2005) via antidiagonal Gröbner degeneration of matrix Schubert varieties. We consider instead diagonal Gröbner degenerations. In this dual setting, Knutson, Miller, and Yong (2009) obtained alternative combinatorics for the class of vexillary matrix Schubert varieties. We will discuss general diagonal degenerations, relating them to an older formula of Lascoux (2002) in terms of the 6vertex ice model. Lascoux's formula was recently rediscovered by Lam, Lee, and Shimozono (2018), as "bumpless pipe dreams." We will explain this connection and discuss conjectures and progress towards understanding diagonal Gröbner degenerations of matrix Schubert varieties. This is joint work with Zachary Hamaker and Oliver Pechenik. See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Fri Nov 06 
IMA/MCIM Industrial Problems Seminar1:25pm  ZoomActive Community Detection with Maximal Expected Model Change Dan Kushnir, Nokia Bell Labs Abstract:We present a novel active learning algorithm for community detection on networks. Our proposed algorithm uses a Maximal Expected Model Change (MEMC) criterion for querying network nodes label assignments. MEMC detects nodes that maximally change the community assignment likelihood model following a query. Our work is inspired by detection in the benchmark Stochastic Block Model (SBM), where we provide sample complexity analysis and empirical study with SBM and real network data for binary as well as for multiclass settings. We also cover the most challenging case of sparse degree and belowdetectionthreshold SBMs, where we observe a superlinear error reduction. MEMC is shown to be superior to the random selection baseline and other stateoftheart active learners. Dan Kushnir is a distinguished member of technical staff at Bell Laboratories Data Science group where he has been since 2012. Before that he held the Gibbs assistant professor position at Yale University's Applied Math Program from 2008 to 2012. He obtained his PhD at the Weizmann Institute of Science on the subject of Multiscale Tools for Data Analysis in 2008. He hold BsC in Computer Science from the Hebrew University in Jerusalem. His Current Interests Include Active Learning, efficient Sampling, Harmonic Analysis, Numerical Analysis and Randomized methods. 
Fri Nov 06 
MathCEP Seminar10:10am  ZoomMathCEP Seminar 
Thu Nov 05 
Colloquium3:30pm  Via Zoom ID 91514486597 (contact faculty for pw)Lowdegree hardness of random optimization problems David Gamarnik, Massachusetts Institute of Technology Abstract:We consider the problem of finding nearly optimal solutions of optimization problems with random objective functions. Two concrete problems we consider are (a) optimizing the Hamiltonian of a spherical or Ising pspin glass model, and (b) finding a large independent set in a sparse ErdosRenyi graph, both to be introduced in the talk. We consider the family of algorithms based on lowdegree polynomials of the input. This is a general framework that captures methods such as approximate message passing and local algorithms on sparse graphs, among others. We show this class of algorithms cannot produce nearly optimal solutions with high probability. Our proof uses two ingredients. On the one hand both models exhibit the Overlap Gap Property (OGP) of nearoptimal solutions. Specifically, for both models, every two solutions close to optimality are either close or far from each other. The second proof ingredient is the stability of the algorithms based on lowdegree polynomials: a small perturbation of the input induces a small perturbation of the output. By an interpolation argument, such a stable algorithm cannot overcome the OGP barrier thus leading to the inapproximability. The stability property is established using concepts from Gaussian and Boolean Fourier analysis, including noise sensitivity, hypercontractivity, and total influence. Joint work with Aukosh Jagannath and Alex Wein. 
Thu Nov 05 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Nov 04 
Probability Seminar4:00pm  Via ZoomHypercontractivity, Convexity, and Lower Deviations Petros Valettas, University of Missouri Abstract:The concentration of measure phenomenon is an indispensable tool in the study of highdimensional phenomena. 
Wed Nov 04 
PDE Seminar3:35pm  Via ZoomThe Nmembrane problem Hui Yu, Columbia University Abstract:The Nmembrane problem is the study of shapes of elastic membranes being pushed against each other. The main questions are the These are classical questions in free boundary problems. However, very In this talk, we discuss, for general N, the optimal regularity of the This talk is based on two recent joint works with Ovidiu Savin 
Tue Nov 03 
Dynamical Systems2:30pm  Via ZoomDynamical Systems Seminar 
Tue Nov 03 
IMA Data Science Lab Seminar1:25pm  ZoomLecture ,  
Tue Nov 03 
IMA Data Science Lab Seminar1:25pm  OnlineMachine Learning Methods for Solving Highdimensional Meanfield Game Systems Levon Nurbekyan, University of California, Los Angeles Abstract:Meanfield games (MFG) is a framework to model and analyze huge populations of interacting agents that play noncooperative differential games with applications in crowd motion, economics, finance, etc. Additionally, the PDE that arise in MFG have a rich mathematical structure and include those that appear in optimal transportation and density flow problems. In this talk, I will discuss applications of machinelearning techniques to solve highdimensional MFG systems. I will present Lagrangian, GANtype, and kernelbased methods for suitable types of MFG systems. I am currently an Assistant Adjunct Professor at the Department of Mathematics at UCLA. I previously held postdoctoral and visiting positions at McGill University, King Abdullah University of Science and Technology, National Academy of Sciences of Armenia, and the Technical University of Lisbon. I have also been a Senior Fellow at the Institute for Pure and Applied Mathematics (IPAM) at UCLA for its Spring 2020 Program on High Dimensional HamiltonJacobi PDEs and a Simons CRM Scholar at the University of Montreal for its Spring 2019 Program on Data Assimilation: Theory, Algorithms, and Applications. 
Tue Nov 03 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Nov 02 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Nov 02 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Nov 02 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Mon Nov 02 
Math Biology Seminar12:00pm  Zoom Details see abstractTopological considerations in genome biology Mariel Vazquez, University of California Davis Abstract:The genetic code of viruses and of living organisms is encoded in very long DNA or RNA molecules, which are tightly packaged in confined environments. Understanding the geometry and topology of nucleic acids is key to understanding the mechanisms of viral infection and the inner workings of a cell. We use techniques from knot theory and lowdimensional topology, aided by discrete methods and computational tools, to ask questions about the topological state of a genome. I will illustrate the use of these methods with examples drawn from our work on bacteriophages.Join Zoom Meeting https://umn.zoom.us/j/94817303643?pwd=aHBrNFpzaFdLSU9HUjJybllla3M3QT09 Meeting ID: 948 1730 3643 Passcode: R90eZ8 
Mon Nov 02 
Special Events and Seminars11:00am  https://umn.zoom.us/j/92455367464HAGMTPDE Seminar Tomas Merchán Rodríguez, University of Minnesota, Minnesota 
Fri Oct 30 
MCFAM Seminar7:30pm  Zoom: https://umn.zoom.us/j/99433158383?pwd=T3h6Trends in applied mathematics and its adoption in the finance industry, or why you should pass on blockchains and big data John Dodson, Options Clearing Corporation Abstract:Over the course of the twentieth century, applied mathematics has gradually assimilated and standardized the subjects of probability, statistics, control, and information. While an outside observer of decadal trends in STEM in finance might instead focus on the industry's embrace of computing technology during the Moore's Law era, I claim these quieter developments are ultimately more impactful because they help firms to organize information technology and financial innovation to create lasting value for clients. I will demonstrate this through a survey of the changing role of quants, and make an attempt to describe current opportunities.Bio: John is Vice President, Quantitative Risk Management at the Options Clearing Corporation in Chicago, which is the principal central counterparty for equity derivatives. Previously, John was with the treasury and investment risk management departments of Ameriprise Financial in Minneapolis. Prior to returning to the midwest, John worked for several major international banks in New York, London, and Zurich. He entered the industry out of college with an appointment at the Bank for International Settlements. John is an Adjunct professor with MCFAMs Master of Financial Mathematics (MFM) program. In addition to his affiliation with MCFAMs MFM program, John has taught about financial derivatives for the Carlson School of Management and for various industry programs. John has a BS degree in physics and mathematics from Stanford and an MS degree in computational finance from Carnegie Mellon. John's affiliation with the U of M goes back to the 80's. He was an UMTYMP student and also participated in a mentorship program with the head of the physics department during his high school years. Zoom Link: https://umn.zoom.us/j/99433158383?pwd=T3h6LzlTWCt4YW93Kzk3Rmg2bXQrZz09 
Fri Oct 30 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847The closed support problem over a complete intersection ring Monica Lewis, University of Michigan Abstract:Local cohomology modules are (typically) very large algebraic objects that encode rich geometric information about the structure of a commutative ring. These modules are rarely finitely generated, but when the underlying space is smooth, there is often additional structure available that can lead to remarkable finiteness properties. For example, there are large classes of regular rings whose local cohomology is known to always have a finite set of associated primes. This property can fail over a complete intersection rings, but independent results of Hochster and NúñezBetancourt (2017) or Katzman and Zhang (2017) have shown that at least in characteristic p > 0, the local cohomology of a hypersurface ring will still have closed support in the Zariski topology. It remains an open question whether this property holds in arbitrary codimension. In this talk, I will present my results on the local cohomology of a parameter ideal illustrating an obstruction to straightforwardly generalizing existing hypersurface strategies. I will then present joint work with Eric Canton on an alternative route of attack in higher codimension, involving a novel Frobeniuscompatible simplicial complex of local cohomology modules. See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Fri Oct 30 
IMA/MCIM Industrial Problems Seminar1:25pm  ZoomEstimating the Impact of Travel, Rest, and Playing at Home in the National Football League Tom Bliss, National Football League (NFL) Abstract:Estimating schedule difficulty in the National Football League is tricky given the limited number of games and the number of factors that impact game outcomes, including timevarying team strengths, the home advantage, and changes in rest, travel, and time zones. From the league’s perspective, understanding each of these factors can give us a better understanding of scheduling equity and competitive balance. We extend the Bayesian statespace model of Lopez, Matthews, and Baumer (2018) to estimate varying levels of rest and travel advantages using betting market data. The model accounts for team strength that varies by week and season. We estimate that a team coming off a bye is worth about threequarters of a point, while a shorter rest advantage is worth about half of that. In addition, we find that the benefit of playing at home has dropped approximately a point in the last decade and explore if and how the game looks different on the field as a result. Thompson Bliss is a Data Scientist for the National Football League. He completed his master’s degree in Data Science at Columbia University in the City of New York in December 2019. At Columbia, he worked as a graduate assistant for a Sports Analytics course taught by Professor Mark Broadie. He received a Bachelor of Science in Physics and Astronomy at University of Wisconsin  Madison in 2018. 
Fri Oct 30 
MathCEP Seminar10:10am  ZoomMathCEP Seminar 
Thu Oct 29 
Colloquium3:30pm  Via Zoom ID 91514486597 (contact faculty for pw)The Weyl group and the nilpotent orbits Zhiwei Yun, Massachusetts Institute of Technology Abstract:The Weyl group and the nilpotent orbits are two basic objects attached to a semisimple Lie group. The interplay between the two is a key ingredient in the classification of irreducible representations in various contexts. In this talk, I will describe two different constructions to relate these two objects due to KazhdanLusztig, Lusztig and myself. I will concentrate on the construction using the loop geometry of the group. The main result is that the two seemingly different give the same maps between conjugacy classes in the Weyl group and the set of nipotent orbits. 
Thu Oct 29 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Oct 28 
Probability Seminar4:00pm  Via ZoomRandom walks on dynamic random environments with nonuniform mixing Marcelo Hilário, The Federal University of Minas Gerais Abstract:In this talk, we will discuss recent results on the limiting behavior of random walks on dynamic random environments. We will mainly discuss the case when then random walk evolves on onedimensional random environments given by conservative interacting particle systems such as the simple symmetric exclusion process. Our results depend a great deal on spacetime mixing properties imposed on the underlying environment and also on other features like the dimension and the type of allowed transitions. Conservation of particles leads to poormixing conditions which complicate the applicability of available tools and to overcome this difficulty we use renormalization to obtain the law of large numbers, large deviation estimates, and sometimes central limit theorems. The talk is based on several joint works with Oriane Blondel, Frank den Hollander, Daniel Kious, Renato dos Santos, and Vladas Sidoravicius. 
Wed Oct 28 
PDE Seminar3:35pm  Via ZoomStationary Euler flows near the Kolmogorov and Poiseuille flows Michele Coti Zelati, Imperial College London Abstract:We exhibit a large family of new, nontrivial stationary states of analytic regularity, that are arbitrarily close to the Kolmogorov flow on the square torus. Our construction of these stationary states builds on a degeneracy in the global structure of the Kolmogorov flow. This is in contrast with both the Kolmogorov flow on a rectangular torus and the Poiseuille flow in a channel, for which we can show that the only stationary states near them must be shears. This has surprising consequences in the context of inviscid damping in 2D Euler and enhanced dissipation in NavierStokes.Join Zoom Meetinghttps://umn.zoom.us/j/91765959125?pwd=RjRkSW9PNi9HNzVOb2lwb0tkWVVoZz09Meeting ID: 917 6595 9125Passcode: VinH16 
Tue Oct 27 
Dynamical Systems2:30pm  Via Zoom Link  see abstractDynamics on networks (and other things!) Lee DeVille, University of Illinois Abstract:We will introduce several models connected to applications and present several results, mostly analytic but also some numerical. These models will be defined on networks or higherorder objects (e.g. simplicial complexes). In many of the cases, the dynamical systems can be characterized as nonlinear Laplacians; as such, various classical and notsoclassical results about Laplacians will be the secret sauce that undergirds the results. We will also try to give some insight into the applications that give rise to the problems, as time permits. Zoom Link: https://umn.zoom.us/meeting/register/tJ0lcCsrjIqHN1xLgljWWlDIYBIUwKwJK 
Tue Oct 27 
IMA Data Science Lab Seminar1:25pm  ZoomClustering Highdimensional Data with Path Metrics: A Balance of Density and Geometry Anna Little, The University of Utah Abstract:This talk discusses multiple methods for clustering highdimensional data, and explores the delicate balance between utilizing data density and data geometry. I will first present pathbased spectral clustering, a novel approach which combines a densitybased metric with graphbased clustering. This densitybased path metric allows for fast algorithms and strong theoretical guarantees when clusters concentrate around lowdimensional sets. However, the method suffers from a loss of geometric information, information which is preserved by simple linear dimension reduction methods such as classic multidimensional scaling (CMDS). The second part of the talk will explore when CMDS followed by a simple clustering algorithm can exactly recover all cluster labels with high probability. However, scaling conditions become increasingly restrictive as the ambient dimension increases, and the method will fail for irregularly shaped clusters. Finally, I will discuss how a more general family of path metrics, combined with MDS, give lowdimensional embeddings which respect both data density and data geometry. This new method exhibits promising performance on single cell RNA sequence data and can be computed efficiently by restriction to a sparse graph. Anna Little received her PhD from Duke University in 2011, where she worked under Mauro Maggioni to develop a new multiscale method for estimating the intrinsic dimension of a data set. From 20122017 she was an Assistant Professor of Mathematics at Jacksonville University, a primarily undergraduate liberal arts institution where in addition to teaching and research she served as a statistical consultant. In 2018 she began a research postdoc in the Department of Computational Mathematics, Science, and Engineering at Michigan State University, where she worked with Yuying Xie and Matthew Hirn on statistical and geometric analysis of highdimensional data. She recently accepted a tenuretrack position in the Department of Mathematics at the University of Utah, which will begin in January 2021. 
Tue Oct 27 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Oct 26 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Oct 26 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Oct 26 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Mon Oct 26 
Math Biology Seminar12:00pm  Zoom Details see abstractA mathematical model for the Iondependent DNA Configuration in Bacteriophage Capsids Pei Liu, University of Minnesota &nbs Abstract:Bacteriophages densely pack their long dsDNA genome inside a protein capsid. The conformation of the viral genome inside the capsid is consistent with a hexagonal liquid crystal structure, and experimental results have confirmed that it depends on the environmental ionic conditions. We propose a mathematical model to describe the dependence of DNA configurations inside bacteriophage capsids on different ion types and concentrations. The total free energy of the system combines the liquid crystal free energy, the electrostatic energy and the LennardJones energy. This energy determines the DNA and ionic distributions and is governed by a nonlinear second order partial differential equation (PDE). The numerical results show good agreement with existing experiments and molecular dynamics simulations. In this talk, I will first briefly introduce the basic ideas in the liquid crystal theory and the electrolyte theory, then describe how we apply these ideas to model the DNA configuration in a bacteriophage capsid. Zoom details:Join Zoom Meeting https://umn.zoom.us/j/94817303643?pwd=aHBrNFpzaFdLSU9HUjJybllla3M3QT09 Meeting ID: 948 1730 3643 Passcode: R90eZ8 
Mon Oct 26 
Special Events and Seminars11:00am  https://umn.zoom.us/j/91393860723HAGMTPDE Seminar Alex Barron, University of Illinois  Urbana Champaign, Illinois 
Fri Oct 23 
MCFAM Seminar7:30pm  Zoom Link: https://umn.zoom.us/j/99433158383?pwdQuantifying the Impact of the Social Determinants of Health in the Covid19 Era Shae Armstrong, Optum Abstract:The Social Determinants of Health (SDoH) are key factors in each persons environment and life that influence clinical outcomes of their health and wellbeing. These factors include, but are not limited to, income, housing, food security, education, and geography. In the age of Covid19, understanding these factors and how they correlate to each other is more important than ever. Once we as industry gain insight on these clinical and financial impacts, we need to translate that insight into policy to mitigate root cause issues to better serve patients across the country. During this lecture we lay the foundation by defining what the Social Determinants of Health are and the various categories they fall into. We will also examine what data sources feed various SDoH models and limitations of said data sources. Next we will conduct a deepdive examination on a variety of case studies and models aimed at quantifying the shortterm and longterm clinical and financial impact of Covid19. From there we will touch on the future and impact of healthcare data analytics within the healthcare industry and as human beings navigating an unprecedented pandemic. Bio: Shae Armstrong is a Senior Healthcare Economic Consultant at OptumCare, a subsidiary of Optum, focusing on data strategy efforts to support a myriad of users from actuaries to data scientists who in turn, use data results to help providers make the best decisions for their patients. OptumCare is one of the largest healthcare systems in the nation, delivering care to patients in 15 states across the country. OptumCare is recognized nationally for its unique emphasis on data driven results and valuebased care, creating a more effective and efficient kind of care. Data strategy efforts Shae currently supports ranges from data validation, standardization, and curation to defining data quality standards to operationalizing and optimizing data engines, streams, and processes. Prior to working at OptumCare, Shae was an Actuarial Analyst at Mercer Consulting working on actuarial pricing for a variety of state Medicaid programs. At Mercer she learned some of the fundamental data components and validations needed to support a wide variety actuarial and data science reporting needs. Shae is an alumnus of the University of Minnesota: Twin Cities where she double majored in Mathematics specializing in Actuarial Science (B.A.) and Economics (B.S.) with a minor in Risk Management and 
Fri Oct 23 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847Posets, Cones, and Toric Varieties John Machacek, (from HampdenSydney College) Abstract:To any poset on [n] we can associate a cone in a natural way. This is done by a correspondence between i < j and the halfspace x_i <= x_j. To any cone (or fan of cones) we have a toric variety. We consider translations back and forth between properties of posets and toric varieties. From this point of view we can establish Oda's strong factorization conjecture in the special case of fans arising from posets. We will also preview in progress work joint with Josh Hallam on crepant resolutions and the Gorenstein property for toric varieties associated to posets. 
Fri Oct 23 
IMA/MCIM Industrial Problems Seminar1:25pm  ZoomLecture Chris Finlay, Deep Render 
Fri Oct 23 
IMA/MCIM Industrial Problems Seminar1:25pm  ZoomAn Introduction to Image Compression, Old and New Chris Finlay, Deep Render Abstract:Image compression, as a subset of image processing, intersects many areas of applied mathematics. In this talk, I will describe and compare the "classic" view of image compression, such as the JPEG algorithm and it's variants, against the "new kid on the block", namely compression using neural networks (NN). I will survey the relative merits of NNbased compression algorithms, provide a rundown of the inner workings, and discuss some of their flaws. We'll see that the neural network approach promises impressive performance gains over traditional image compression algorithms, though some hurdles still remain. Chris Finlay is a research scientist at Deep Render, a UK startup focused on AIbased image and video compression. His background is in applied mathematics, but has spent time dabbling in machine leaning and computer science. Prior to moving to industry, he worked as a postdoc in machine learning, mainly researching neural ODEs, generative modeling, and the robustness of deep learning computer vision algorithms. He obtained a PhD in applied mathematics from McGill University, where he studied numerical methods for nonlinear elliptic PDEs. 
Fri Oct 23 
MathCEP Seminar10:10am  ZoomEvaluating process skills Mike Weimerskirch and Hadley Young Abstract:ELIPSS (Enhanced Learning by Improving Process Skills in STEM) focuses on the identification, development, and assessment of process skills in active learning, undergraduate STEM classrooms. We will define several process skills and give rubrics to measure them.Zoom URL: https://umn.zoom.us/j/94699262069?pwd=ay9hbmU4V0pOWUFZZU5FTWZJMWFwdz09Zoom ID: 946 9926 206Zoom password: 7mwvv2 
Thu Oct 22 
Colloquium3:30pm  Zoom ID 91514486597 (contact faculty for pw)An analytic version of the Langlands correspondence for complex curves Edward Frenkel, University of California, Berkeley Abstract:The Langlands correspondence for complex curves is traditionally formulated in terms of sheaves rather than functions. Recently, Robert Langlands asked whether it is possible to construct a functiontheoretic version. Together with Pavel Etingof and David Kazhdan, we have formulated a functiontheoretic version as a spectral problem for (a selfadjoint extension of) an algebra of commuting differential operators on the moduli space of Gbundles of a complex algebraic curve. I will start the talk with a brief introduction to the Langlands correspondence. I will discuss both the geometric and the functiontheoretic versions for complex curves, and the relations between them. I will then present some of the results and conjectures from my joint work with Etingof and Kazhdan. 
Thu Oct 22 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Oct 21 
Probability Seminar4:00pm  Via ZoomOn microscopic derivation of a continuum meancurvature flow Sunder Sethuraman, University of Arizona Abstract:We derive a continuum meancurvature flow as a scaling limit of a class of zerorange + Glauber interacting particle systems. The zerorange part moves particles while preserving particle numbers, and the Glauber part allows birth and death of particles, while favoring two levels of particle density. When the two parts are simultaneously seen in certain (different) timescales, and the Glauber part is `bistable', a meancurvature interface flow, incorporating a homogenized `surface tension' reflecting microscopic rates, between the two levels of particle density, can be captured as a limit of the mass empirical density. This is work with Perla El Kettani, Tadahisa Funaki, Danielle Hilhorst, and Hyunjoon Park. 
Wed Oct 21 
PDE Seminar3:35pm  Via ZoomQuantitative stability for minimizing Yamabe metrics Robin Neumeyer, Northwestern University Abstract:The Yamabe problem asks whether, given a closed Riemannian manifold, one can find a conformal metric of constant scalar curvature (CSC). An affirmative answer was given by Schoen in 1984, following contributions from Yamabe, Trudinger, and Aubin, by establishing the existence of a function that minimizes the socalled Yamabe energy functional; the minimizing function corresponds to the conformal factor of the CSC metric. We address the quantitative stability of minimizing Yamabe metrics. On any closed Riemannian manifold we showin a quantitative sensethat if a function nearly minimizes the Yamabe energy, then the corresponding conformal metric is close to a CSC metric. Generically, this closeness is controlled quadratically by the Yamabe energy deficit. However, we construct an example demonstrating that this quadratic estimate is false in the general. This is joint work with Max Engelstein and Luca Spolaor. 
Tue Oct 20 
IMA Data Science Lab Seminar1:25pm  ZoomHow COVID19 has Changed the World and What the Future Holds Michael Osterholm, University of Minnesota, Twin Cities Abstract:This presentation will provide a current and in depth review of the Covid19 pandemic. It will also provide a glimpse into the future as to how this pandemic will continue to unfold and the impact it will have worldwide. Dr. Osterholm is Regents Professor, McKnight Presidential Endowed Chair in Public Health, the director of the Center for Infectious Disease Research and Policy (CIDRAP), Distinguished Teaching Professor in the Division of Environmental Health Sciences, School of Public Health, a professor in the Technological Leadership Institute, College of Science and Engineering, and an adjunct professor in the Medical School, all at the University of Minnesota. From June 2018 through May 2019, he served as a Science Envoy for Health Security on behalf of the US Department of State. He is also on the Board of Regents at Luther College in Decorah, Iowa. 
Tue Oct 20 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Tue Oct 20 
Dynamical Systems10:00am  Zoom Link  See AbstractNonlinear stability of fast invading fronts in a GinzburgLandau equation with an additional conservation law Bastian Hilder , University of Stuttgart Abstract:In this talk, I consider the stability of traveling fronts connecting an invading state to an unstable ground state in a GinzburgLandau equation with an additional conservation law. This system appears generically as an amplitude equation for Turing pattern forming systems admitting a conservation law structure such as the BénardMarangoni convection problem. The main result is the nonlinear stability of sufficiently fast fronts with respect to perturbations which are exponentially localized ahead of the front. The proof is based on the use of exponential weights ahead of the front to stabilize the ground state. After presenting the general strategy, I discuss the specific challenges faced in the proof, namely the lack of a comparison principle and the fact that the invading state is only diffusively stable, i.e. perturbations of the invading state decay polynomially in time. Zoom Link: https://umn.zoom.us/meeting/register/tJ0lcCsrjIqHN1xLgljWWlDIYBIUwKwJK 
Mon Oct 19 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Oct 19 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Oct 19 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Mon Oct 19 
Math Biology Seminar12:00pm  Via ZoomMathematical Virology: Geometry as a key to the discovery of novel antiviral solutions Reidun Twarock, University of York, UK Abstract:Viruses encapsulate their genetic material into protein containers that act akin to molecular Trojan horses, protecting viral genomes between rounds of infection and facilitating their release into the host cell environment. In the majority of viruses, including major human pathogens, these containers have icosahedral symmetry. Mathematical techniques from group, graph and tiling theory can therefore be used to better understand how viruses form, evolve and infect their hosts, and point the way to novel antiviral solutions. In this talk, I will present a theory of virus architecture, that contains the seminal Caspar Klug theory as a special case and solves longstanding open problems in structural virology. I will also introduce mathematical models of symmetry breaking in viral capsids and discuss their consequences for our understanding of more complex viral geometries. By combining these geometric insights with a range of different mathematical and computational modelling techniques, I will demonstrate how viral life cycles can be better understood through the lens of viral geometry, and how such insights can act as drivers of discovery of novel antiviral solutions. Join Zoom Meeting https://umn.zoom.us/j/94817303643?pwd=aHBrNFpzaFdLSU9HUjJybllla3M3QT09 Meeting ID: 948 1730 3643 Passcode: R90eZ8 
Mon Oct 19 
Special Events and Seminars11:00am  https://umn.zoom.us/j/97066564629HAGMTPDE Seminar Dallas Albritton, Courant Institute, New York 
Fri Oct 16 
MCFAM Seminar7:30pm  Zoom Link: https://umn.zoom.us/j/99433158383?pwdMultiStep Forecast of Implied Volatility Surface using Deep Learning Zhiguang (Gerald) Wang, South Dakota State University Abstract:Modeling implied volatility surface (IVS) is of paramount importance to price and hedge an option. We contribute to the literature by modeling the entire IVS using recurrent neural network architectures, namely Convolutional Long Short Term Memory Neural Network (ConvLSTM) to produce multivariate and multistep forecasts of the S&P 500 implied volatility surface. Using the daily S&P 500 index options from 2002 to 2019, we benchmark the ConvLSTM model against traditional multivariate time series VAR model, VEC model, and LSTM neural network. We find that both LSTM and ConvLSTM can fit the training data extremely well with mean absolute percentage error (MAPE) being 3.56% and 3.88%, respectively. As for outofsample data, the ConvLSTM (8.26% ) model significantly outperforms traditional time series models as well as the LSTM model for a 1day, 30day, and 90day horizon, for all moneyness groups and contract months of both calls and puts. Zoom Link: https://umn.zoom.us/j/99433158383?pwd=T3h6LzlTWCt4YW93Kzk3Rmg2bXQrZz09 
Fri Oct 16 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847Polarizations of Powers of Graded Maximal Ideals Ayah Almousa, Cornell University Abstract:Given a monomial ideal, one can "polarize" it to a squarefree monomial ideal that has all of the same homological invariants as the original one. Many commutative algebraists are familiar with the use of the "standard" polarization, but the first major use of a nonstandard polarization was by Uwe Nagel and Vic Reiner in the early 2000s, who used the "box polarization" to produce a minimal cellular resolution for strongly stable ideals. This leads to the natural question: what other ways are there to polarize a monomial ideal, and what other applications might there be for these nonstandard polarizations? In this talk, I will give a complete combinatorial characterization of all possible polarizations of powers of the graded maximal ideal in a polynomial ring. I will also give a combinatorial description of their Alexander duals and discuss applications of polarizations to commutative algebra, algebraic geometry, and combinatorics. This is joint work with Gunnar Fløystad and Henning Lohne. See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Fri Oct 16 
IMA/MCIM Industrial Problems Seminar1:25pm  ZoomSystems Modeling in Biopharma Helen Moore, Applied BioMath Abstract:Quantitative systems pharmacology (QSP) models are increasingly being used for decision making in the biotechnology/pharmaceutical (biopharma) industry. QSP models are typically systems of ordinary differential equations with some mechanistic level of detail of the disease and a therapy. Parameters in a QSP model may be estimated from data, or obtained from the literature or from input from disease/biology experts. Once parameter values or distributions are determined, a QSP model can be used for predictive purposes. I will show some examples of QSP models used in projects for various applications in the biopharma industry. I will also mention some of the issues and open problems for the use of QSP models. Dr. Moore is a mathematician who spent 11 years in academia working in modeling and optimization, primarily in oncology, immunology, and virology. While in academia, she won two teaching awards and received a National Science Foundation grant for her research. During 14 years in the biopharma industry, she has worked in a variety of therapeutic areas and drug development stages at Genentech, Certara, BristolMyers Squibb, AstraZeneca, and now Applied BioMath. In 2018, she was named a Fellow of the Society for Industrial and Applied Mathematics. Her current work includes mechanistic ODE systems modeling, modeling of tumor dynamics, optimization of combination regimens, and quantitative evaluation of predictive mathematical models. She graduated from the University of North Carolina at Chapel Hill in 1989, and earned her PhD in mathematics from Stony Brook University in New York in 1995. 
Thu Oct 15 
Colloquium3:30pm  Zoom ID 91514486597 (contact faculty for pw)The diffeomorphism group of a 4manifold Daniel Ruberman, Brandeis University Abstract:Associated to a smooth ndimensional manifold are two infinitedimensional groups: the group of homeomorphisms Homeo(M), and the group of diffeomorphisms, Diff(M). For manifolds of dimension greater than 4, the topology of these groups has been intensively studied since the 1950s. For instance, Milnor's discovery of exotic 7spheres immediately shows that there are distinct path components of the diffeomorphism group of the 6sphere that are connected in its homeomorphism group. The lowest dimension for such classical phenomena is 5. I will discuss recent joint work with Dave Auckly about these groups in dimension 4. For each n, we construct a simply connected 4manifold Z and an infinite subgroup of the nth homotopy group of Diff(Z) that lies in the kernel of the natural map to the corresponding homotopy group of Homeo(Z). These elements are detected by (n+1)parameter gauge theory. The construction uses a topological technique. 
Thu Oct 15 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Oct 14 
Probability Seminar4:00pm  Via ZoomNUUMN Joint Probability Seminar 
Wed Oct 14 
PDE Seminar3:35pm  Via ZoomRadon measures and lipschitz graphs Lisa Naples, Macalaster College Abstract:In geometric measure theory there is interest in understanding measures by studying interactions with particular collections of sets. Here, we will discuss a recent characterization of Radon measures on R^n which are carried by the collection of mLipschitz graphs. That is, we will provide necessary and sufficient conditions for a Radon measure under which there exist countably many Lipschitz graphs that capture almost all of the mass. Our characterization will involve only countably many evaluations of the measure. This is joint work with Matthew Badger.Join Zoom Meetinghttps://umn.zoom.us/j/91765959125?pwd=RjRkSW9PNi9HNzVOb2lwb0tkWVVoZz09Meeting ID: 917 6595 9125Passcode: VinH16 
Tue Oct 13 
Dynamical Systems2:30pm  Zoom link: See abstractA coordinate transformation to highlight interesting flow features: local orthogonal rectification Jonathan Rubin, University of Pittsburgh Abstract:Following some pioneering earlier work, there has been an uptick in efforts to develop coordinate transformations that provide natural coordinate systems in which it becomes easier to study certain flow features. Many of these transformations are local or focus on periodic orbits and associated small perturbations. In this talk, I will introduce a new coordinate transformation, local orthogonal rectification (LOR), recently developed by my graduate student Ben Letson (SFL Scientific) and me. I will illustrate how LOR provides new insights about forms of transient dynamics including rivers, dynamics of trajectories as they approach periodic orbits, and canards, and represents a useful tool that others may wish to apply for the analysis of such phenomena. Zoom Link: https://umn.zoom.us/meeting/register/tJ0lcCsrjIqHN1xLgljWWlDIYBIUwKwJK 
Tue Oct 13 
IMA Data Science Lab Seminar1:25pm  ZoomGeometric Methods in Statistics, Optimization, and Sampling Tyler Maunu, Massachusetts Institute of Technology Abstract:I will address some recent developments in geometric methods for optimization, statistics, and sampling. Within three specific examples, I will demonstrate how one can leverage geometric structure to achieve: 1) robust recovery results for nonconvex estimators, 2) fast statistical rates in Wasserstein barycenter estimation, and 3) efficient sampling algorithms. First, in regard to robust recovery, I consider the problems of robust subspace recovery and robust synchronization. Each of these problems has an underlying manifold structure that is exploited to yield stateoftheart robustness guarantees and efficient algorithms. Next, I will discuss the problem of statistical estimation of Wasserstein barycenters and develop a condition that ensures fast rates for an efficiently computable estimator. Finally, I will show how the leveraging the structure of gradient flows on Wasserstein space allows one to develop fast rates of convergence for sampling algorithms. The discretization of these flows leads to novel sampling algorithms that offer distinct advantages over existing methods. Tyler received his Ph.D. in Mathematics and M.S. in Statistics from the University of Minnesota in 2018, where he worked with Prof. Gilad Lerman on the problem of robust subspace recovery. Since then, he has been an Instructor in Applied Mathematics at MIT, where he has worked with Prof. Philippe Rigollet on problems related to optimization, optimal transport, and sampling. 
Tue Oct 13 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Oct 12 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Oct 12 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Oct 12 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Fri Oct 09 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847Combinatorics and CoEulerian Representations for Coincidental Reflection Groupsmmutative Algebra Sarah Brauner, University of Minnesota Abstract:The Eulerian idempotents of a real reflection group and the representations they generate are a topic of longstanding interest to combinatorialists, representation theorists and topologists. In Type A, these representations have connections to the braid arrangement, Solomon's descent algebra, and mysteriously arise as the graded pieces of the cohomology of the configuration space of $n$ ordered points in $\mathbb{R}^3$. In this talk, I will describe how this relationship generalizes to real reflection groups of coincidental typethat is, reflection groups whose exponents form an arithmetic progressionby characterizing the Eulerian representations as (among other things) components of the associated graded VarchenkoGelfand ring. All of the above concepts will be defined during the talk. See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Thu Oct 08 
MCFAM Distinguished Lecture Series5:30pm  Via ZoomClimate Change and Insurance Vijay Manghanani, SVP, Risk & Analytics, PIMCO ILS Fund, Chief Risk Officer/Chief Actuarial Officer at Newport Re Abstract:Climate Change is one of the most significant and yet poorly understood risks faced by organizations today. While there is general consensus on the climate impact of continued greenhouse gas emissions, there remains significant uncertainty in the exact timing and severity of most serious extreme events. This uncertainty has led to a 'tragedy of the horizons' among much of the financial sector, where short term risks and financial decisions need to be balanced against long term secular risks introduced by climate change. The risks posed by climate change can be broadly classified into two categories, physical and transition risks. Physical risks refer to the increased direct exposure to changing frequency and severity of extreme events. Transition risks pertain to impacts on traditional business models and sectors as society shifts towards a lower carbon economy. A comprehensive analysis for these risks necessarily involves rigorous portfolio stress testing and scenario analysis on both the asset and liability side of the balance sheet. While climate change is a global phenomenon, the specific weather extremes are very local. The embedded correlations and nonlinear impacts make financial outcome distributions skewed and fat tailed. The financial models used to assess climate change risk need to adequately reflect the complex spatiotemporal interactions between nature and physical/financial assets. The insurance industry, in its key role as a risk transfer intermediary is often at the forefront of the financial impacts of climate change. The industry is not a novice to dealing with climate risks emanating from extreme events, such as hurricanes, floods, wildfires, etc. In response to the significant earnings and capital impacts of such extreme events, the industry has evolved over the past 3 decades, a fairly robust toolkit to assess physical climate risks using sophisticated catastrophe risk models. We will discuss how these models can help assess physical climate risks in insurance portfolios and how a similar approach might be adapted for broader finance portfolios. Bio: Dr. Manghnani is a senior risk and analytics executive at the PIMCO with a focus on the Insurance Linked Security asset class. He is also the Chief Actuary and Chief Risk Officer at Newport Re. Most recently, he was the Head of Catastrophe Risk Management and Analytics COE at AIG. In this role, he was responsible for implementing state of the art 
Thu Oct 08 
Colloquium3:30pm  Zoom ID 91514486597 (contact faculty for pw)Meanfield disordered systems and HamiltonJacobi equations JeanChristophe Mourrat, Courant Institute of Mathematical Sciences, New York University Abstract:The goal of statistical mechanics is to describe the largescale behavior of collections of simple elements, often called spins, that interact through locally simple rules and are influenced by some amount of noise. A celebrated model in this class is the Ising model, where spins can take the values +1 and 1, and the local interaction favors the alignement of the spins. In this talk, I will mostly focus on the situation where the interactions are themselves disordered, with some pairs having a preference for alignement, and some for antialignement. These models, often called "spin glasses", are already surprisingly difficult to analyze when all spins directly interact with each other. I will describe a fundamental result of the theory called the Parisi formula. I will then explain how this result can be recast using suitable HamiltonJacobi equations, and what benefits this new point of view may bring to the topic. 
Thu Oct 08 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Oct 07 
Probability Seminar4:00pm  Via ZoomThe rtop norm of nonnegative random matrices Souvik Dhara, MIT Abstract:For an n\times n matrix A_n, the r\to p operator norm is defined as \A_n\_{r\to p}:= \sup_{x \in R^n:\x\_r\leq 1 } \A_n\_p for r, p\geq 1. For different choices of r and p, this norm corresponds to key quantities that arise in diverse applications including matrix condition number estimation, clustering of data, and finding oblivious routing schemes in transportation networks. This talk considers r\to p norms of symmetric random matrices with nonnegative entries, including adjacency matrices of ErdosRenyi random graphs, matrices with positive subGaussian entries, and certain sparse matrices. For 1< p\leq r< \infty, the asymptotic normality, as n\to\infty, of the appropriately centered and scaled norm \A_n\_{r\to p} is established. Furthermore, a sharp \ell_\inftyapproximation for the unique maximizing vector in the definition of \A_n\_{r\to p} is obtained, which may be of independent interest. In fact, the vector approximation result is shown to hold for a broad class of deterministic sequence of matrices having certain asymptotic expansion properties. The results obtained can be viewed as a generalization of the seminal results of F\"{u}redi and Koml\'{o}s (1981) on asymptotic normality of the largest singular value of a class of symmetric random matrices, which corresponds to the special case r=p=2 considered here. In the general case with 1< p\leq r < \infty, the spectral methods are no longer applicable, which requires a new approach, involving a refined convergence analysis of a nonlinear power method and establishing a perturbation bound on the maximizing vector. This is based on a joint work with Debankur Mukherjee (Georgia Tech) and Kavita Ramanan (Brown University). 
Wed Oct 07 
PDE Seminar3:35pm  Via ZoomTwo problems related to the boundary layer in fluids Siming He, Duke University Abstract:In this talk, I will present two works related to boundary layers in thefluid. The first result concerns the 2D NavierStokes equations linearized around the Couette flow in the periodic channel in the vanishing viscosity limit. We split the vorticity evolution into thefreeevolution (without a boundary) and a boundary corrector that is exponentially localized. If the initial vorticity perturbation is supported away from the boundary, we show inviscid damping of both thevelocity and the boundary layer's vorticity. We also observe that both velocity and vorticity satisfy the expected enhanced dissipation. This is joint work with Jacob Bedrossian. The second work is related to aboundary layer model designed to understand the HouLuo Scenario associated with the 3D Euler equation's blowup. We show that there exists initial data which yields blowup in the model. This is joint workwith Alexander Kiselev.Join Zoom Meetinghttps://umn.zoom.us/j/91765959125?pwd=RjRkSW9PNi9HNzVOb2lwb0tkWVVoZz09Meeting ID: 917 6595 9125Passcode: VinH16 
Tue Oct 06 
Dynamical Systems2:30pm  Zoom link: See abstractEpidemiological Forecasting with Simple Nonlinear Models Joceline Lega , University of Arizona Abstract:Every week, the CDC posts COVID19 death forecasts for the US and its states and territories. These estimates are created with an ensemble model that combines probabilistic predictions made by a variety of groups in the US and abroad. Our model, EpiCovDA, which is developed by mathematics graduate student Hannah Biegel and combines simple nonlinear modeling with data assimilation, is one of these contributions. In this talk, I will present a novel paradigm for epidemiological modeling that is based on a dynamical systems perspective, and which consists in describing an outbreak in terms of incidence versus cumulative case curves. I will then explain how this approach may be used for parameter estimation and how it is combined with data assimilation in EpiCovDA. Zoom Link: https://umn.zoom.us/meeting/register/tJ0lcCsrjIqHN1xLgljWWlDIYBIUwKwJK 
Tue Oct 06 
IMA Data Science Lab Seminar1:25pm  ZoomLargeScale Semisupervised Learning via Graph Structure Learning over Highdense Points Li Wang, University of Texas at Arlington Abstract:We focus on developing a novel scalable graphbased semisupervised learning (SSL) method for a small number of labeled data and a large amount of unlabeled data. Due to the lack of labeled data and the availability of largescale unlabeled data, existing SSL methods usually encounter either suboptimal performance because of an improper graph or the high computational complexity of the largescale optimization problem. In this paper, we propose to address both challenging problems by constructing a proper graph for graphbased SSL methods. Different from existing approaches, we simultaneously learn a small set of vertexes to characterize the highdense regions of the input data and a graph to depict the relationships among these vertexes. A novel approach is then proposed to construct the graph of the input data from the learned graph of a small number of vertexes with some preferred properties. Without explicitly calculating the constructed graph of inputs, two transductive graphbased SSL approaches are presented with the computational complexity in linear with the number of input data. Extensive experiments on synthetic data and real datasets of varied sizes demonstrate that the proposed method is not only scalable for largescale data, but also achieve good classification performance, especially for extremely small number of labels. Dr. Li Wang is currently an assistant professor with Department of Mathematics and Department of Computer Science Engineering, University of Texas at Arlington, Texas, USA. She worked as a research assistant professor with Department of Mathematics, Statistics, and Computer Science at University of Illinois at Chicago, Chicago, USA from 2015 to 2017. She worked as the Postdoctoral Fellow at University of Victoria, BC, Canada in 2015 and Brown University, USA, in 2014. She received her Ph.D. degree in Department of Mathematics at University of California, San Diego, USA, in 2014. Her research interests include data science, largescale optimization and machine learning. 
Tue Oct 06 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Oct 05 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Oct 05 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Oct 05 
Student Number Theory Seminar1:00pm  Via ZoomStudent Number Theory Seminar 
Mon Oct 05 
Special Events and Seminars11:00am  https://umn.zoom.us/j/93698530123HAGMTPDE Seminar Hong Wang, Institute for Advanced Study, New Jersey 
Fri Oct 02 
MCFAM Seminar7:30pm  Zoom : https://umn.zoom.us/j/99433158383?pwd=T3hEfficient Risksensitivity Estimation for EquityLinked Insurance Benefits Liban Mohammed, University of Wisconsin Madison Abstract:For an organization with billions of dollars in assets, precise risk management is necessary to safeguard those assets. However, when the risks these assets are exposed to depend on the future performance of equities in complex ways, directly estimating them in realtime to the necessary precision can be prohibitively expensive. This talk discusses some approaches to resolving this tension via metamodeling techniques.Bio: Liban Mohamed is a finalyear PhD student in the UWMadison Department of Mathematics. His research focuses on the scattering theory of solutions to the Schrodinger equation on discrete spaces. The content of this talk is the result of a project hosted by the 2020 IMA MathtoIndustry Boot Camp with industry partners at Securian Financial.Zoom Link: https://umn.zoom.us/j/99433158383?pwd=T3h6LzlTWCt4YW93Kzk3Rmg2bXQrZz09 
Fri Oct 02 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847Random Flag Complexes and Torsion in Syzygies of Random Monomial Ideals Jay Yang, University of Minnesota Abstract:In our paper Random Flag Complexes and Asymptotic Syzygies, Daniel Erman and I constructed a model of a random monomial ideal, and showed that the Betti tables for the ideals in this model exhibited asymptotic behavior reminiscent of the Veronese module. This inspired recent work with Daniel Erman and Caitlyn Booms showing that StanleyReisner ideals corresponding to random flag complexes almost always have Betti tables that depend on characteristic. We use this to offer a heuristic on when to expect that the syzygies of the Veronese should depend on characteristic.See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Fri Oct 02 
IMA/MCIM Industrial Problems Seminar1:25pm  ZoomCombinatorial Algorithms for National Security Cynthia Phillips, Sandia National Laboratories Abstract:Working at a national laboratory can be somewhere in between academia and industry. I will describe my perspective of what makes working at a lab unique, based on my experience in the Computing Research Center at Sandia National Laboratories. I will mention skills that will help a researcher succeed in this environment, many just those that will help anywhere. The constraints and priorities of nationalsecurity problems often give even abstracted problems unusual twists. I will summarize some example research projects from data science (streaming data management for cybersecurity, cooperative computing among autonomous data centers for counterterrorism) to solvers (highly parallel branch and bound) to the intersection of government and industry (e.g. sensor placement for municipal water networks with the US EPA). Cynthia Phillips is a senior scientist at Sandia National Laboratories. In her 30 years at the lab she has conducted research in combinatorial optimization, algorithm design and analysis, and parallel computation with more recent work in data science such as streaming algorithms. The applications reflect some of the diversity of Sandia's mission including scheduling, network and infrastructure surety, computational biology, computer security, quantum computing, neuromorphic computing, hardware/algorithm codesign, social network analysis, wireless networks and sensor placement (e.g. for municipal water networks for the EPA). Her work spans highly theoretical papers to generalpurpose codes to applications. She has done extensive professional service including being a professional society officer and a conference chair. She is an Association for Computing Machinery distinguished scientist and a Society for Industrial and Applied Mathematics fellow. She received a B.A. in applied mathematics from Harvard University and a PhD in computer science from MIT. 
Thu Oct 01 
Colloquium3:30pm  Zoom ID 91514486597 (contact faculty for pw)Gradient variational problems Richard Kenyon, Yale University Abstract:This is joint work with Istvan Prause. Many wellknown random tiling models such as domino tilings and square ice lead to variational problems for functions h:R^2>R which minimize a functional depending only on the gradient of h. Other examples of such variational problems include minimal surfaces and surfaces satisfying the "plaplacian". We give a representation of solutions of such a problem in terms of kappaharmonic functions: functions which are harmonic for a laplacian with a varying conductance kappa. 
Thu Oct 01 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Sep 30 
Probability Seminar4:00pm  Via ZoomEmpirical measures, geodesic lengths, and a variational formula in firstpassage percolation Erik Bates, University of WisconsinMadison Abstract:We consider the standard firstpassage percolation model on Z^d, in which each edge is assigned an i.i.d. nonnegative weight, and the passage time between any two points is the smallest total weight of a nearestneighbor path between them. Our primary interest is in the empirical measures of edgeweights observed along geodesics from 0 to ne_1. For various dense families of edgeweight distributions, we prove that these measures converge weakly to a deterministic limit as n tends to infinity. The key tool is a new variational formula for the time constant. In this talk, I will derive this formula and discuss its implications for the convergence of both empirical measures and lengths of geodesics. 
Wed Sep 30 
PDE Seminar3:35pm  https://umn.zoom.us/j/91765959125?pwd=RjRkSW9PNiOn the Cauchy problem for the Hall magnetohydrodynamics Sungjin Oh, University of California Berkeley Abstract:In this talk, I will describe a recent series of work with I.J. Jeong on the incompressible Hall MHD equation without resistivity. This PDE, first investigated by the applied mathematician M. J. Lighthill, is a onefluid description of magnetized plasmas with a quadratic secondorder correction term (Hall current term), which takes into account the motion of electrons relative to positive ions. Curiously, we demonstrate the ill(!)posedness of the Cauchy problem near the trivial solution, despite the apparent linear stability and conservation of energy. Our ill posedness mechanism is sharp, in that it remains true under fractional dissipation of any subcritical order. On the other hand, we identify several regimes in which the Cauchy problem is wellposed, which not only includes the original setting that M. J. Lighthill investigated (namely, for initial data close to a uniform magnetic field) but also possibly large perturbations thereof. Central to our proofs is the viewpoint that the Hall current term imparts the magnetic field equation with a quasilinear dispersive character. With such a viewpoint, the key ill and wellposedness mechanisms can be understood in terms of the properties of the bicharacteristic flow associated with the appropriate principal symbol.Join Zoom Meetinghttps://umn.zoom.us/j/91765959125?pwd=RjRkSW9PNi9HNzVOb2lwb0tkWVVoZz09Meeting ID: 917 6595 9125Passcode: VinH16 
Tue Sep 29 
Dynamical Systems2:30pm  Via ZoomDynamical Systems Seminar 
Tue Sep 29 
IMA Data Science Lab Seminar1:25pm  OnlineMultiPerspective, Simultaneous Embedding and Theoretically Guaranteed Projected Power Method for the Multiway Matching Problem Vahan Huroyan, University of Arizona Abstract:We address two important subproblems of Structure from Motion Problem. The first subproblem is known as Multiway Matching, where the input includes multiple sets, with the same number of objects and noisy measurements of fixed onetoone correspondence maps between the objects of each pair of sets. Given only noisy measurements of the mutual correspondences, the Multiway Matching problem asks to recover the correspondence maps between pairs of them. The desired output includes the original fixed correspondence maps between all pairs of sets. The second subproblem is called MultiPerspective Simultaneous Embedding (MPSE). The input for MPSE assumes a set of pairwise distance matrices defined on the same set of objects and possibly along with the same number of projection operators. MPSE embeds points in 3D so that the pairwise distances are preserved under the corresponding projections. Our proposed algorithm for Multiway Matching problem iteratively solves the associated nonconvex optimization problem. We prove that for a specific noise model, if the initial point of our proposed iterative algorithm is good enough, the algorithm linearly converges to the unique solution. Numerical experiments demonstrate that our method is much faster and more accurate than the stateoftheart methods. For MPSE, we propose a heuristic algorithm and provide an extensive quantitative evaluation with datasets of different sizes, as well as several examples that illustrate the quality of the resulting solutions. I received my PhD in mathematics from the University of Minnesota in 2018, under the supervision of my advisor Prof. Gilad Lerman. Since 2018, I've been working as a Postdoctoral Research Associate at the Department of Mathematics of the University of Arizona.

Tue Sep 29 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Sep 28 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Sep 28 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Sep 28 
Special Events and Seminars11:00am  https://umn.zoom.us/j/96572145611HAGMTPDE Seminar Hyunwoo Kwon, Republic of Korea Air Force Academy, South Korea 
Fri Sep 25 
MCFAM Seminar7:30pm  https://umn.zoom.us/j/99433158383?pwd=T3h6LzlTWCActuarial Implications of COVID19 Max Rudolph, Rudolph Financial Abstract:COVID19 has had a material impact on all practice areas of the actuarial profession, ranging widely include traditional areas like health and mortality claims, assets and economic activity, but also risk management and strategic planning. This session assumes you know many of the basic statistics and provides observations about how analysis of the virus is evolving.Bio: MAX J. RUDOLPH, FSA CFA CERA MAAAMax Rudolph is a credentialed actuary, active in the AssetLiability Management and Enterprise Risk Management space for many years. He was named a thought leader in ERM within the actuarial profession, chaired the ERM Symposium, the SOA Investment Section Council and the SOAs Investment Actuary Symposium. He is a past SOA board member and received a Presidential Award for his role developing the CERA credential. He was the subject matter expert for the original Investment and ERM modules, wrote the ERM courseware document and has been involved with the actuarial professions climate change and pandemic efforts. He is a frequent speaker at actuarial seminars and universities, and an awardwinning author.For the past 14 years Max has led Rudolph Financial Consulting, LLC, an independent consulting practice, focusing its insurance practice on ERM and ALM consulting. He has completed projects relating to life, health, annuity, and casualty insurers. He is an adjunct professor for Creighton Universitys Heider School of Business, where he focuses on ERM and investment topics.Max has completed a number of well received research reports covering topics such as emerging risks, low growth, low interest rates, investments, systemic risk and ERM. Other topics he has written about include pandemics, ALM and value investing. Many of his papers can be found at www.rudolphfinancial.com. He comments on a variety of risk topics from @maxrudolph on twitter. 
Fri Sep 25 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847On a RankUnimodality Conjecture of MorierGenoud and Ovsienko Bruce Sagan, Michigan State University Abstract:Let $\alpha=(a,b,\ldots)$ be a composition. Consider the associated poset $F(\alpha)$, called a fence, whose covering relations are $$x_1\lhd x_2 \lhd \ldots\lhd x_{a+1}\rhd x_{a+2}\rhd \ldots\rhd x_{a+b+1}\lhd x_{a+b+2}\lhd \ldots\.$$ We study the associated distributive lattice $L(\alpha)$ consisting of all lower order ideals of $F(\alpha)$. These lattices are important in the theory of cluster algebras and their rank generating functions can be used to define $q$analogues of rational numbers. In particular, we make progress on a recent conjecture of MorierGenoud and Ovsienko that $L(\alpha)$ is rank unimodal. We show that if one of the parts of $\alpha$ is greater than the sum of the others, then the conjecture is true. We conjecture that $L(\alpha)$ enjoys the stronger properties of having a nested chain decomposition and having a rank sequence which is either top or bottom interlacing, the latter being a recently defined property of sequences. We verify that these properties hold for compositions with at most three parts and for what we call $d$divided posets, generalizing work of Claussen and simplifying a construction of Gansner. This is joint work with Thomas McConville and Clifford Smyth.See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Fri Sep 25 
IMA/MCIM Industrial Problems Seminar1:25pm  ZoomThe Technical and Organizational Challenges of Data Science Catherine (Katy) Micek, 3M Abstract:In October 2012 – shortly after I began my career in the data science space – the Harvard Business Review published the article “Data Scientist: The Sexiest Job of the 21st Century” and generated an enormous amount of buzz about the field. Since then, data science has matured: technical skill sets required to do the work are better defined and specializations are emerging. However, the field is still evolving and how data science is used by an organization can vary greatly. In such a dynamic and broadly defined field, it has been my experience that data scientists need to have a wide range of technical skills augmented by soft skills in order to be successful. In this talk, I will share my experience working as a predictive modeler, data scientist, and software developer across various industries (insurance, energy, and within 3M), as well as provide examples of challenges I’ve encountered as a data scientist. I will also discuss my work on a Digital Solutions Implementation for 3M’s Knoxville plant, a project where we are exploring how data science to understand and reduce product variability for Acrylic Foam Tape. Catherine (Katy) Micek is a Data Scientist at 3M in St. Paul, Minnesota. She holds a Ph.D. in Applied Mathematics from the University of Minnesota. In her Ph.D. thesis, Katy developed mathematical models for polymer gel swelling with applications to artificial bone implants and drugdelivery devices. Katy has worked in both academic and industrial positions since earning her degree. In addition to teaching college mathematics, she has worked on crossfunctional business teams as a data scientist, software developer, and predictive modeler teams across diverse industries (insurance, energy, finance, supply chain, and manufacturing). Katy is also an active speaker and mentor. She is frequently invited to college, universities, and conferences to discuss her technical work and career experiences in data science, and she is a contributor to publications by the Society of Industrial and Applied Mathematics on industrial career options. In her free time, Katy enjoys spending time with friends and family, as well as ballroom dancing, rock climbing, and cooking. 
Thu Sep 24 
Colloquium3:30pm  Zoom ID 91514486597 (contact faculty for pw)Random walks in graphbased learning Jeff Calder, University of Minnesota, Twin Cities Abstract:I will discuss several applications of random walks to graphbased learning, both for theoretical analysis and algorithm development. Graphbased learning is a field within machine learning that uses similarities between datapoints to create efficient representations of highdimensional data for tasks like semisupervised classification, clustering and dimension reduction. Our first application will be to use the random walk interpretation of the graph Laplacian to characterize the lowest label rate at which Laplacian regularized semisupervised learning is wellposed. Second, we will show how analysis via random walks leads to a new algorithm that we call Poisson learning for semisupervised learning at very low label rates. Finally, we will show how stochastic coupling of random walks can be used to prove Lipschitz estimates for graph Laplacian eigenfunctions on random geometric graphs, leading to new spectral convergence results. This talk will cover joint work with many people, including Brendan Cook (UMN), NicolasGarcia Trillos (WisconsinMadison), Marta Lewicka (Pittsburgh), Dejan Slepcev (CMU), Matthew Thorpe (University Manchester). 
Thu Sep 24 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Thu Sep 24 
Special Events and Seminars11:00am  https://umn.zoom.us/j/93601442665HAGMTPDE Seminar Bingyang Hu, Purdue University, Indiana 
Wed Sep 23 
Probability Seminar9:00am  Via ZoomForest fire processes and nearcritical percolation with heavytailed impurities Pierre Nolin, City University of Hong Kong Abstract:We discuss models of forest fires (or epidemics): on a given planar lattice, all vertices are initially vacant, and then become occupied at rate 1. If an occupied vertex is hit by lightning, which occurs at a (typically very small) rate, all the vertices connected to it "burn" instantaneously, i.e. they become vacant. We want to analyze the behavior of such processes near and beyond the critical time (the time after which, in the absence of fires, infinite connected components would emerge). We are led to introduce a percolation model where regions ("impurities") are removed from the lattice, in an independent fashion. These impurities are not only microscopic, but also allowed to be mesoscopic. We are interested in whether the connectivity properties of percolation remain of the same order as without impurities, for values of the percolation parameter close to the critical value. This generalizes a celebrated result by Kesten for nearcritical percolation (that can be viewed as critical percolation with singlesite impurities). This talk is based on a joint work with Rob van den Berg (CWI and VU, Amsterdam). 
Tue Sep 22 
Dynamical Systems2:30pm  Zoom  see link belowAnderson localization for disordered trees Selim Sukhtaiev, Auburn University Abstract:In this talk, we will discuss a mathematical treatment of a disordered system modeling localization of quantum waves in random media. We will show that the transport properties of several natural Hamiltonians on metric and discrete trees with random branching numbers are suppressed by disorder. This phenomenon is called Anderson localization. https://umn.zoom.us/meeting/register/tJ0lcCsrjIqHN1xLgljWWlDIYBIUwKwJK 
Tue Sep 22 
IMA Data Science Lab Seminar1:25pm  OnlineMatrix Denoising with Weighted Loss William Leeb, University of Minnesota, Twin Cities Abstract:This talk will describe a new class of methods for estimating a lowrank matrix from a noisy observed matrix, where the error is measured by a type of weighted loss function. Such loss functions arise naturally in a variety of problems, such as submatrix denoising, filtering heteroscedastic noise, and estimation with missing data. We introduce a family of spectral denoisers, which preserve the left and right singular subspaces of the observed matrix. Using new asymptotic results on the spiked covariance model in high dimensions, we derive the optimal spectral denoiser for weighted loss. We demonstrate the behavior of our method through numerical simulations. William Leeb is an Assistant Professor in the School of Mathematics at the University of Minnesota, Twin Cities. He earned his PhD from Yale University in 2015 under the supervision of Ronald Coifman, and from 2015 to 2018 was a postdoc in Amit Singer's research group at Princeton University. William's research is in applied and computational harmonic analysis, statistical signal processing, and machine learning. He is particularly interested in estimation problems with low signaltonoise ratios, high dimensionality, and many nuisance parameters. 
Tue Sep 22 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Sep 21 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Sep 21 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Sep 18 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847Betti numbers of unordered configuration spaces of a punctured torus Yifeng Huang, University of Michigan Abstract:Let X be a elliptic curve over C with one point removed, and consider the unordered configuration spaces Conf^n(X)={(x_1,...,x_n): x_i\neq x_j for i\neq j} / S_n. We present a rational function in two variables from whose coefficients we can read off the ith Betti numbers of Conf^n(X) for all i and n. The key of the proof is a property called "purity", which was known to Kim for (ordered or unordered) configuration spaces of the complex plane with r >= 0 points removed. We show that the unordered configuration spaces of X also have purity (but with different weights). This is a joint work with G. Cheong. See seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Fri Sep 18 
IMA/MCIM Industrial Problems Seminar1:25pm  OnlineSIAM Internship Panel Montie Avery, University of Minnesota, Twin Cities Abstract:The event will have graduate students speaking about their experiences with their internships. The facilitator of the event is Montie Averie. The participants of the Graduate Student Internship Panel will be: Carter Chain (interned at Travelers) Brendan Cook (interned at Target) Ty Frazier (interned at Securian Financial and Lawrence Berkeley national lab) Jacob Hegna (interned at Google) Sarah Milstein (interned at Ayasdi, 3M, IDA, Cargill and Smart Information Flow Technologies (SIFT)) Amber Yuan (interned at Argonne national lab, ExxonMobil and Activision Blizzard). The event is organized by the SIAM Student Chapter at the University of Minnesota. 
Thu Sep 17 
Colloquium3:30pm  Zoom ID 91514486597 (contact faculty for pw)25 years since Fermat's Last Theorem Frank Calegari, University of Chicago Abstract:Wiles's proof of Fermat's Last Theorem was published 25 years ago. Wiles's paper introduced many new ideas and methods which have since shaped the field of algebraic number theory. This colloquium talk intends to give a (biased) tour of these developments, especially with regard to questions that might be of interest to nonspecialists. 
Thu Sep 17 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Wed Sep 16 
Probability Seminar4:00pm  Via ZoomTail bounds for the averaged empirical distribution on a geodesic in firstpassage percolation WaiKit Lam, UMN Abstract:Consider $\mathbb{Z}^d$ with nearestneighbor edges. In firstpassage percolation, we place i.i.d. nonnegative weights $(t_e)$ on the edges, and study the induced graph metric $T(x,y)$. A geodesic is a minimizing path for this metric. In a joint work with M. Damron, C. Janjigian and X. Shen, we study the empirical distribution on a geodesic $\gamma$ from $0$ to $x$: $\nu^x(B) := (number of edges e in \gamma with t_e \in B) / (number of edges e in \gamma)$. We establish bounds for the averaged empirical distribution $E \nu^x(B)$, particularly showing that if the law of $t_e$ has finite moments of any order strictly larger than 1, then roughly speaking the limiting averaged empirical distribution has all moments. 
Wed Sep 16 
AMS Intro to Research Seminar12:20pm  ZoomVegetation patterns in dryland ecosystems Paul Carter Abstract:In waterlimited regions, competition for water resources results in the formation of vegetation patterns; on sloped terrain, one finds that the vegetation typically aligns in stripes or arcs. The dynamics of these patterns can be modeled by reactiondiffusion PDEs describing the interplay of vegetation and water resources, where sloped terrain is modeled through advection terms representing the downhill flow of water. We focus on one such model in the 'largeadvection' limit, and we prove the existence of traveling planar stripe patterns using analytical and geometric techniques. We also discuss implications for the stability of the resulting patterns, as well as the appearance of curved stripe solutions. 
Tue Sep 15 
Dynamical Systems2:30pm  Zoom  see link belowDynamical systems for metabolic networks Nicola Vassena, Free University Berlin Abstract:In this talk I will give an overview of one approach to the analysis of metabolic networks, using dynamical systems. When considered in applications, one of the main features of these networks is that the interaction functions (reaction rates) are practically unknown. That is, the most reliable data is the structure of network. For this reason, we present here a qualitative approach based on the structure of the network, only, where no quantitative information is needed. In particular, following this approach, we introduce how to address some bifurcation problems and sensitivity analysis. https://umn.zoom.us/meeting/register/tJ0lcCsrjIqHN1xLgljWWlDIYBIUwKwJK 
Tue Sep 15 
Climate Seminar11:15am  ZoomClimate Seminar TBA 
Mon Sep 14 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Sep 14 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Sep 14 
Special Events and Seminars11:00am  https://umn.zoom.us/j/91467804294"Harmonic AnalysisGeometric Measure TheoryPartial Differential Equations Seminar" Bruno Poggi Cevallos, University of Minnesota 
Fri Sep 11 
Combinatorics Seminar3:35pm  Zoom ID is 94127949847Order Polynomial Product Formulas and Poset Dynamics Sam Hopkins Abstract:I'll present a heuristic for finding special families of partially ordered sets. The heuristic says that the posets with order polynomial product formulas are the same as the posets with good dynamical behavior. Here the order polynomial is a certain enumerative invariant of the poset. Meanwhile, the dynamics includes promotion of linear extensions, and rowmotion of order ideals and Ppartitions. This talk includes joint work with Tri Lai, and with Martin Rubey. see seminar website for password: http://wwwusers.math.umn.edu/~ovenh001/seminar.html 
Fri Sep 11 
IMA/MCIM Industrial Problems Seminar1:25pm  ZoomFlying High with Math Sharon Arroyo, Shabnam Khamooshi, The Boeing Company, The Boeing Company Abstract:Sharon and Shabnam are members of Boeing Research & Technology. They partner with business units to develop operations research based solutions and mathematical tools that help Boeing reduce costs, improve products and operations. They have developed operations research and math solutions as well as simulation models for applications across Boeing including supply chain, aircraft delivery, airline scheduling, wind tunnel testing, robot scheduling, logistics, communication networks, sensor fusion, rate analysis, and facility layout design. In this presentation, Sharon and Shabnam will give an overview of some of the projects on which they have worked and will give insights into what it is like to work as a mathematician in industry. Sharon Arroyo Shabnam Khamooshi 
Thu Sep 10 
Colloquium3:30pm  Zoom ID 91514486597 (contact faculty for pw)Kinetic theory of structured populations: demographics, cell size control, and stochastic hierarchies Tom Chou, University of California, Los Angeles Abstract:We will briefly review, through two examples, classic deterministic PDE models of population dynamics structured according to attributes such as age and/or size. First, we describe how the original McKendrick model was used to motivate China's onechild policy, and generalize it to include an imposed, finite interbirth refractory period. We quantify the effectiveness of this softer, staggered birth policy and discuss its predicted effectiveness. We then review sizertimeraddertype models used to quantify proliferating cell populations. Here, blowup in mean cell sizes can arise, which represents a challenging numerical problem. Finally, we extend these classic deterministic models to allow for both demographic and growthrate stochasticity by developing a fully kinetic theory. Marginalization of the full density functions results in a set of coupled kinetic models similar to the BBGKY hierarchy. We map out the different combinations of stochastic descriptions and show how the classic agedependent population models are connected to this hierarchy, the lowest order of which is a master equation for the total stochastic population. Differences in the stochastic description of birth through budding or splitting are explored. 
Wed Sep 09 
Probability Seminar4:00pm  Via ZoomNUUMN Joint Probability Seminar 
Wed Sep 09 
Special Events and Seminars11:00am  https://umn.zoom.us/j/99821709760Hessian Estimates for the Lagrangian mean curvature equation Arunima Bhattacharya, University of Washington, Washington Abstract:In this talk, we will derive a priori interior Hessian estimates for the Lagrangian mean curvature equation under certain natural restrictions on the Lagrangian phase. As an application, we will use these estimates to solve the Dirichlet problem for the Lagrangian mean curvature equation with continuous boundary data, on a uniformly convex, bounded domain in R^n. 
Tue Sep 08 
Dynamical Systems2:30pm  Via ZoomDynamical Systems Seminar 
Mon Sep 07 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Sep 07 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Aug 31 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Aug 31 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Aug 24 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Aug 24 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Tue Aug 18 
IMA Data Science Lab Seminar1:25pm  ZoomFairness, Accountability, and Transparency: (Counter)Examples from Predictive Models in Criminal Justice Kristian Lum, University of Pennsylvania Abstract:The need for fairness, accountability, and transparency in computer models that make or inform decisions about people has become increasingly clear over the last several years. One application area where these topics are particularly important is criminal justice, as statistical models are being used to make or inform decisions that impact highly consequential decisions those concerning an individuals freedom. In this talk, Ill highlight three threads of my own research into the use of machine learning and a statistical models in criminal justice models that demonstrate the importance of careful attention to fairness, accountability, and transparency. In particular, Ill discuss how predictive policing has the potential to reinforce and amplify unfair policing practices of the past. Ill also discuss some of the ways in which recidivism prediction models can fail to require the accountability and transparency necessary to prevent gaming. Kristian Lum is on the faculty at University of Pennsylvania's School of Engineering and Applied Science and is the former Lead Statistician at the Human Rights Data Analysis Group (HRDAG). Kristians research primarily focuses on examining the uses of machine learning in the criminal justice system, including demonstrating the potential for predictive policing models to reinforce and amplify historical racial biases in law enforcement. She has also served on Research Advisory Councils for the New York Citys Mayors Office of Criminal Justice and Philadelphias First Judicial District tasked with advising on the development of fairer algorithmic pretrial risk assessments. Kristian holds an M.S. and Ph.D. from the Department of Statistical Science at Duke University and a B.A. in Mathematics and Statistics from Rice University. 
Mon Aug 17 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Aug 17 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Aug 10 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Aug 10 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Tue Aug 04 
IMA Data Science Lab Seminar1:25pm  ZoomLecture Anil Vullikanti, University of Virginia 
Tue Aug 04 
IMA Data Science Lab Seminar1:25pm  Lind Hall 305A Network Science Approach for Controlling Epidemic Outbreaks Anil Vullikanti, University of Virginia Abstract:The spread of epidemics is a very complex process, and stochastic diffusion models on networks have been found useful, especially when modeling their spread in large and heterogeneous populations, where individual and community level behaviors need to be represented. A fundamental problem in such models is to understand how to control the spread of an epidemic by interventions such as vaccination (which can be modeled as node removal) and social distancing (which can be modeled as edge removal). A number of heuristics have been studied, such as selecting nodes based on degree and eigenscore. However, rigorous algorithms with approximation guarantees are not well understood, and is the focus of this talk. We will discuss two approaches for epidemic control from a network science perspective. The first involves reducing the spectral radius of the graph, motivated by a characterization that shows that epidemics in some models die out fast if the spectral radius is below a threshold. We discuss algorithms for this problem and its generalizations. The second approach involves stochastic optimization, using a sample average approximation combined with rounding. We show that this approach gives near optimal solutions in practice, and have interesting structural properties, which might be useful Anil Vullikanti is a Professor in the Department. of Computer Science and the Biocomplexity Institute at the University of Virginia. His research interests are in the broad areas of network science, dynamical systems, combinatorial optimization, and distributed computing, and their applications to computational epidemiology and social networks. 
Mon Aug 03 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Aug 03 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Jul 27 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jul 27 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Jul 20 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jul 20 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Jul 13 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jul 13 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Jul 06 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jul 06 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Jun 29 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jun 29 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Tue Jun 23 
IMA Data Science Lab Seminar1:25pm  OnlineComputational Science for COVID19 Pandemic Planning and Response Madhav Marathe, University of Virginia Abstract:The ongoing COVID19 pandemic represents an unprecedented global crisis. In this talk, using COVID19 as an exemplar, Madhav Marathe is the division director of the Networks Simulation 
Mon Jun 22 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jun 22 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Jun 15 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jun 15 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Tue Jun 09 
IMA Data Science Lab Seminar1:25pm  OnlineData and Models for COVID19 DecisionMaking Forrest Crawford, Yale University Abstract:As states begin to reopen, there is an urgent need for 
Mon Jun 08 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jun 08 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Mon Jun 01 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jun 01 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Thu May 28 
Analysis and PDE Working Seminar3:00pm  https://sites.google.com/view/summerseminarAnalysis and PDE Working Seminar Gianmarco Brocchi, University of Birmingham 
Tue May 26 
Analysis and PDE Working Seminar3:35pm  https://sites.google.com/view/summerseminarAnalysis and PDE Working Seminar <b> </b>Lisa Naples , University of Connecticut Abstract:

Mon May 25 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon May 25 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri May 22 
IMA/MCIM Industrial Problems Seminar1:25pm  OnlineAI for COVID19: An Online Virtual Care Approach Xavier Amatriain, Curai Abstract:With half of the worlds population lacking access to healthcare services, and 30% of the adult population in the US having inadequate health insurance coverage to get even basic access to services, it should have been clear that a pandemic like COVID19 would strain the global healthcare system way over its maximum capacity. In this context, many are trying to embrace and encourage the use of telehealth as a way to provide safe and convenient access to care. However, telehealth in itself can not scale to cover all our needs unless we improve scalability and efficiency through AI and automation. In this talk, we will describe how our work on combining latest AI advances with medical experts and online access has the potential to change the landscape in healthcare access and provide 24/7 quality healthcare. Combining areas such as NLP, vision, and automatic diagnosis we can augment and scale doctors. We will describe our work on combining expert systems with deep learning to build stateoftheart medical diagnostic models that are also able to model the unknowns. We will also show our work on using language models for medical Q&A . More importantly, we will describe how those approaches have been used to address the urgent and immediate needs of the current pandemic. Xavier Amatriain is cofounder/CTO of Curai, a startup using AI to scale the worlds best healthcare to every human being. Prior to this, he was VP of Engineering at Quora, and Research/Engineering Director at Netflix, where he led the team building the famous Netflix recommendation algorithms. Before going into leadership positions in industry, Xavier was a researcher in both academia and industry. With over 50 publications in different fields, Xavier is best known for his work on machine learning in general and recommender systems in particular. He has lectured at different universities both in the US and Spain and is frequently invited as a speaker and senior committee member at conferences. 
Thu May 21 
Analysis and PDE Working Seminar3:35pm  https://sites.google.com/view/summerseminarAnalysis and PDE Working Seminar Wenjie Lu, University of Minnesota 
Tue May 19 
IMA Data Science Lab Seminar1:25pm  OnlineTransmission Dynamics of Influenza and SARSCoV2: Environmental Determinants, Inference and Forecast Jeffrey Shaman, Columbia University Abstract:Dynamic models of infectious disease systems are often used to study the epidemiological characteristics of disease outbreaks, the ecological mechanisms and environmental conditions affecting transmission, and the suitability of various mitigation and intervention strategies. In recent years these same models have been employed to generate probabilistic forecasts of infectious disease incidence at the population scale. Here I present research from my own group describing investigation of the environmental determinants of influenza transmissibility and development of model systems and combined modelinference frameworks capable of simulation, inference and forecast of disease outbreaks with a particular focus on influenza and SARSCoV2. 
Mon May 18 
Analysis and PDE Working Seminar3:35pm  https://sites.google.com/view/summerseminarAnalysis and PDE Working Seminar Jack Burkart, Stony Brook University 
Mon May 18 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon May 18 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Tue May 12 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon May 11 
Analysis and PDE Working Seminar3:35pm  https://sites.google.com/view/summerseminarAnalysis and PDE Working Seminar Guillermo Rey, Wing 
Mon May 11 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon May 11 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri May 08 
Combinatorics Seminar3:35pm  the talk will talk place at this Zoom link, atTroupes and Cumulants Colin Defant, Princeton Abstract:Cumulants are the fundamental combinatorial tools used in noncommutative probability theory. Sequences of free cumulants and sequences of classical cumulants are paired with each other via summation formulas involving partition lattices and noncrossing partition lattices. In several cases, a sequence of free cumulants that counts a set of colored binary plane trees happens to correspond, somewhat miraculously, to a sequence of classical cumulants that counts the decreasing labeled versions of the same trees. We will see that this strange phenomenon holds for families of trees that we call troupes, which are defined using two new operations on colored binary plane trees that we call insertion and decomposition. Troupes also provide a broad framework for generalizing several of the results that are known about West's stacksorting map. We will hint at just a couple of the many ways in which the investigation of troupes could be extended further. the talk will talk place at this Zoom link, at 3:35 CDT. 
Fri May 08 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri May 08 
Probability Seminar2:30pm  Vincent Hall 213Probability Seminar 
Fri May 08 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri May 08 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri May 08 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar 
Thu May 07 
Colloquium3:35pm  VinH 16Colloquium Cancelled 
Thu May 07 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Thu May 07 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Symplectic Topology 
Wed May 06 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Wed May 06 
PDE Seminar3:35pm  Vincent Hall 570 ,PDE Seminar  Cancelled 
Tue May 05 
Colloquium3:30pm  VinH 16Colloquium 
Tue May 05 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue May 05 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue May 05 
IMA Data Science Lab Seminar1:25pm  Lind 305Lecture Svetlana Lazebnik, University of Illinois at UrbanaChampaign 
Tue May 05 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon May 04 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium Eric Bonnetier, Université Joseph Fourier 
Mon May 04 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon May 04 
Analysis and PDE Working Seminar3:35pm  TBAAnalysis & PDE Working Seminar Ryan Matzke 
Mon May 04 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon May 04 
Student Number Theory Seminar3:25pm  Vincent Hall 570Student Number Theory Seminar 
Mon May 04 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri May 01 
Combinatorics Seminar3:35pm  Zoom id 391940053Associahedra, Cyclohedra, and inversion of power series Jose Bastidas Abstract:Abstract: Species and Hopf monoids are powerful algebraic tools to study families of combinatorial structures. Aguiar and Ardila introduced the Hopf monoid of generalized permutahedra and realized many combinatorial Hopf monoids as submonoids of generalized permutahedra. They solved the antipode problem for the Hopf monoid of associahedra and explained how the classical Lagrange inversion formula for power series follows from this. In this talk, we bring cyclohedra into the picture. We solve the antipode problem for this new Hopf monoid and use this result to describe inversion in a group of pairs of power series using the face structure of associahedra and cyclohedra. The talk is based on joint work with Marcelo Aguiar (Cornell University). 
Fri May 01 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri May 01 
Probability Seminar2:30pm  Vincent Hall 213Probability Seminar 
Fri May 01 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri May 01 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri May 01 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar TBA 
Thu Apr 30 
Colloquium3:35pm  VinH 16Colloquium Cancelled 
Thu Apr 30 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Thu Apr 30 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Symplectic Topology 
Wed Apr 29 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Wed Apr 29 
PDE Seminar3:30pm  Vincent Hall 570 ,PDE Seminar  Cancelled 
Tue Apr 28 
Colloquium3:30pm  VinH 16Colloquium 
Tue Apr 28 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Apr 28 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Apr 28 
IMA Data Science Lab Seminar1:25pm  Lind 305Detecting New Signals Under Background Mismodeling Sara Algeri, University of Minnesota, Twin Cities Abstract:When searching for new astrophysical phenomena, uncertainty arising from background mismodeling can dramatically compromise the sensitivity of the experiment under study. Specifically, overestimating the background distribution in the signal region increases the chances of missing new physics. Conversely, underestimating the background outside the signal region leads to an artificially enhanced sensitivity and a higher likelihood of claiming false discoveries. The aim of this work is to provide a unified statistical algorithm to perform modeling, estimation, inference and signal characterization under backgroundmismodeling. The method proposed allows to incorporate the (partial) scientific knowledge available on the background distribution, and provides a dataupdated version of it in a purely nonparametric fashion, without requiring the specification of prior distributions. If a calibration sample or control regions are available, the solution discussed does not require the specification of a model for the signal; however, if the signal distribution is known, it allows to further improve the accuracy of the analysis and to detect additional signals of unexpected new sources. 
Tue Apr 28 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Apr 27 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Apr 27 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon Apr 27 
Analysis and PDE Working Seminar3:35pm  Zoom link. https://umn.zoom.us/j/92809219308PDE aspects of the NavierStokes equations Dallas Albritton Abstract:This will be an expository talk on PDE aspects of the NavierStokes equations.Zoom link. https://umn.zoom.us/j/92809219308 
Mon Apr 27 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Apr 27 
Student Number Theory Seminar3:25pm  Vincent Hall 570Student Number Theory Seminar 
Mon Apr 27 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Apr 24 
MCFAM Distinguished Lecture Series5:30pm  VinH 16MCFAM Distinguished Lecture Series  Cancelled 
Fri Apr 24 
Combinatorics Seminar3:35pm  Zoom ID 391940053Coxeter factorizations and the Matrix Tree theorem with generalized JucysMurphy weights Theo Douvropolous Abstract:One of the most far reaching proofs of Cayley's formula, that the number n^{n2} counts trees on n labeled vertices, is via Kirchhoff's Matrix Tree theorem. After Denes, Schaeffer, and many others, there is a wellexploited correspondence between trees and transitive factorizations in the symmetric group; in particular, the number n^{n2} counts shortest factorizations of the long cycle (12..n) in transpositions. Furthermore, Burman and Zvonkine (and independently Alon and Kozma) have given a "highergenus" formula that enumerates arbitrary length factorizations of long cycles, where each transposition (ij) is weighted by its own variable w_ij, and which has a product form involving the eigenvalues of the Laplacian L(K_n) of the complete graph.In joint work with Guillaume Chapuy, we consider a (partial) analog of the weighted Laplacian for complex reflection groups W. The weights are specified via any given flag of parabolic subgroups, generalizing the definition of JucysMurphy elements. We prove a product formula for the enumeration of weighted reflection factorizations of Coxeter elements, that subsumes the ChapuyStump formula and in part the BurmanZvonkine formula. Its proof is based on an interesting fact that relates the exterior powers of the reflection representation with those Wcharacters that are nonzero on the Coxeter class. We present some further applications of these techniques, in particular, a uniform simple(r) way to produce the chain number h^n*n!/W of the noncrossing lattice NC(W). An extended abstract for this work was accepted for FPSAC 2020 and is available at my website (https://www.irif.fr/~douvr001/). 
Fri Apr 24 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Apr 24 
Probability Seminar2:30pm  Vincent Hall 213Rotationally invariant \alphastable stochastic processes with some membranes located on a given surface M. Portenko, Institute of mathematics, Nat. Acad. Sci. Ukraine, Kyiv. Abstract:Two kinds of singular transformations of a rotationally invariant \alphastable process (x(t))_{t \ge 0} in a ddimensional Euclidean space R^d are considered. They are both connected with the notion of a local time on a given surface S in R d for the process (x(t))_{t \ge 0} (it is supposed that \alpha \in (1, 2) and d \ge 2). The first transformation is determined by a given continuous function (p(x))_{x \in S} with nonnegative values and it consists in killing the process (x(t))_{t \ge 0} at a point x \in S with the intensity p(x). This kind of membranes can be called an elastic screen by analogy to that in the theory of diffusion processes. The second transformation is likewise determined by a given function (p(x))_{x \in S} with positive values and its result is the process (x(t))_{t \ge 0} for which any point x \in S is sticky with the intensity r(x). It is shown that each one of these membranes is associated with some initialboundary value problem for a pseudodifferential equation related to the process (x(t))_{t \ge 0}. These facts are established with the help of some generalization of classical theory of singlelayer potentials for situations where, instead of differential, the pseudodifferential equation mentioned above is considered. 
Fri Apr 24 
2:30pm  Walter B28 Unicode test ? 
Fri Apr 24 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Apr 24 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Apr 24 
1:00pm  Walter B28 Django22 Test Abstract:Testing django 2.2 upgrade 
Fri Apr 24 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar TBA 
Thu Apr 23 
Colloquium3:35pm  VinH 16Colloquium Cancelled 
Thu Apr 23 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Thu Apr 23 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Symplectic Topology 
Wed Apr 22 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Wed Apr 22 
PDE Seminar3:30pm  Vincent Hall 570 ,PDE Seminar  Cancelled 
Tue Apr 21 
Colloquium3:30pm  VinH 16Colloquium 
Tue Apr 21 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Apr 21 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Apr 21 
IMA Data Science Lab Seminar1:25pm  Lind 305LECTURE CANCELED ,  
Tue Apr 21 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Apr 20 
Applied and Computational Math Colloquium3:35pm  Zoom Meeting: https://umn.zoom.us/j/531493431Numerical Methods for the Optimal Transport Problem Brittany Hamfeldt, New Jersey Institute of Technology Abstract:The problem of optimal transportation, which involves finding the most costefficient mapping between two measures, arises in many different applications. However, the numerical solution of this problem remains extremely challenging and standard techniques can fail to compute the correct solution. Recently, several methods have been proposed that obtain the solution by solving the MongeAmpere equation, a fully nonlinear elliptic partial differential equation (PDE), coupled to a nonstandard implicit boundary condition. Unfortunately, standard techniques for analyzing numerical methods for fully nonlinear elliptic equations fail in this setting. We introduce a modified PDE that couples the usual MongeAmpere equation to a HamiltonJacobi equation that restricts the transportation of mass. This leads to a simple framework for guaranteeing that a numerical method will converge to the true solution, which applies to a large class of approximation schemes. We describe some simple examples. A range of challenging computational examples demonstrate the effectiveness of this method, including the recent application of these methods to problems in beam shaping and seismic inversion.https://umn.zoom.us/j/531493431 
Mon Apr 20 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon Apr 20 
Analysis and PDE Working Seminar3:35pm  Vincent Hall 6Analysis & PDE Working Seminar Dallas Albritton 
Mon Apr 20 
Analysis and PDE Working Seminar3:35pm  Zoom link. https://umn.zoom.us/j/99241065966Introduction to the Lp theory of stochastic PDEs Timur Yastrzhembskiy Abstract:I will overview the Lptheory of parabolic stochastic partial differential equations (SPDEs) on the whole space developed by N.V. Krylov in the 90s. If time permits, I will discuss the wellposedness of SPDEs driven by spacetime white noise. Such equations are quite popular in the literature. The talk is aimed at people familiar with the theory of PDEs. Little knowledge of probability is assumed.Zoom link. https://umn.zoom.us/j/99241065966 
Mon Apr 20 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Apr 20 
Student Number Theory Seminar3:25pm  Vincent Hall 570Student Number Theory Seminar 
Mon Apr 20 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Apr 17 
MCFAM Seminar5:30pm  Vincent Hall 16MCFAM Seminar MFM Modeling Workshop Presenations, University of Minnesota 
Fri Apr 17 
Combinatorics Seminar3:35pm  Zoom ID 391940053A combinatorial eexpansion of verticalstrip LLT polynomials Per Alexandersson Abstract:In 2019, D'Adderio proved that if G(x;q) is a verticalstrip LLT polynomial, then G(x;q+1) is positive in the elementary symmetric functions basis. A conjectured formula The problem of finding such an eexpansion is surprisingly similar to the still open problem of ShareshianWachs, regarding the eexpansion of chromatic polynomials associated with unitinterval graphs. We shall discuss this connection as well. 
Fri Apr 17 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Apr 17 
Probability Seminar2:30pm  Vincent Hall 213Probability Seminar 
Fri Apr 17 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Apr 17 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Apr 17 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar TBA 
Thu Apr 16 
Colloquium3:35pm  VinH 16Colloquium 
Thu Apr 16 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Thu Apr 16 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Symplectic Topology 
Wed Apr 15 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Local Densities of Diagonal Integral Ternary Quadratic Forms at Odd Primes Edna Jones, Rutgers University Abstract:We give formulas for local densities of diagonal integral ternary quadratic forms at odd primes. Exponential sums and quadratic Gauss sums are used to obtain these formulas. These formulas (along 
Wed Apr 15 
PDE Seminar3:30pm  Vincent Hall 570 ,PDE Seminar  Cancelled 
Wed Apr 15 
IMA Data Science Lab Seminar10:10am  Lind 305LECTURE CANCELED Andrea Montanari, Stanford University 
Tue Apr 14 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Apr 14 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Apr 14 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Apr 14 
IMA Data Science Lab Seminar1:25pm  Lind 305LECTURE CANCELED ,  
Tue Apr 14 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Apr 13 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium  Cancelled Dio Margetis, Maryland 
Mon Apr 13 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon Apr 13 
Analysis and PDE Working Seminar3:35pm  Zoom link. https://umn.zoom.us/j/538855343The boundary value problems in higher codimension Zanbing Dai Abstract:The boundary value problems have been studied for decades. People first studied boundary value problems for the Laplace operator on bounded Lipschitz domains. Using a change of variable argument, we can map Lipschitz domains onto the upper half plane $\mathbb{R}^{d+1}_+$ and converts Laplace operator into a second order elliptic divergence operator, whose coefficient satisfies a certain smoothness condition, the Carleson measure condition. Recently, David, Feneuil and Mayboroda developed an elliptic theory in higher co dimension. They studied a particular degenerate second order elliptic operator $L={\rm div} A\nabla$. Now, the domain we are interested in has more than one nontangential direction. In this talk, I will focus on flat domain $\mathbb{R}^n\setminus \mathbb{R}^d$ and introduce the Dirichlet results, which has been proved recently. Finally, I will introduce my project on the regularity problem in higher codimension. 
Mon Apr 13 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Apr 13 
Student Number Theory Seminar3:25pm  Vincent Hall 570Student Number Theory Seminar 
Mon Apr 13 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Apr 10 
MCFAM Seminar5:30pm  Vincent Hall 16MCFAM Seminar Cancelled 
Fri Apr 10 
Combinatorics Seminar3:35pm  The talk will take place at https://umn.zoom.us/Combinatorics Seminar Brendon Rhoades, UCSD Abstract:The {\em Vandermonde determinant} is ubiquitous in algebraic combinatorics and representation theory. One application of the Vandermonde is as a generator for a `harmonic' model of the coinvariant ring attached to the symmetric group which eschews the use of  and computational issues involved with  quotient rings. We present an extension of the Vandermonde determinant to {\em superspace} (a symmetric algebra tensor an exterior algebra) and use it to generate a variety of modules including the recently defined `Delta Conjecture coinvariant rings' of HaglundRhoadesShimozono as well as (conjecturally) a trigraded module for the full Delta Conjecture. We use superspace Vandermondes to build bigraded superspace quotients tied to the geometry of {\em spanning configurations} studied by PawlowskiRhoades which satisfy a superspace version of Poincar\'e Duality and (conjecturally) exhibit unimodality properties which suggest a superspace version of Hard Lefschetz. Joint with Andy Wilson. 
Fri Apr 10 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Apr 10 
Probability Seminar2:30pm  Vincent Hall 213Probability Seminar 
Fri Apr 10 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Apr 10 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Apr 10 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar TBA 
Thu Apr 09 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Apr 09 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Thu Apr 09 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Symplectic Topology 
Wed Apr 08 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Wed Apr 08 
PDE Seminar3:35pm  Vincent Hall 570 ,PDE Seminar  Cancelled 
Tue Apr 07 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Apr 07 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Apr 07 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Apr 07 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Apr 06 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Apr 06 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon Apr 06 
Analysis and PDE Working Seminar3:35pm  VinH 301Analysis & PDE Working Seminar Timur Yastrzhembskiy 
Mon Apr 06 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Apr 06 
Student Number Theory Seminar3:25pm  Vincent Hall 570Student Number Theory Seminar 
Mon Apr 06 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Apr 03 
MCFAM Seminar5:30pm  Vincent Hall 16MCFAM Seminar Cancelled 
Fri Apr 03 
Combinatorics Seminar3:35pm  Zoom id 391941053, available by clicking herThe boxball system and cyclindric loop Schur functions Gabe Frieden, UQAM Abstract:The boxball system is a cellular automaton in which a sequence of balls moves along a row of boxes. An interesting feature of this automaton is its soliton behavior: regardless of the initial state, the balls in the system eventually form themselves into connected blocks (solitons) which remain together for the rest of time. In 2014, T. Lam, P. Pylyavskyy, and R. Sakamoto conjectured a formula which describes the solitons resulting from an initial state of the boxball system in terms of the tropicalization of certain polynomials they called cylindric loop Schur functions. In this talk, I will describe the various ingredients of this conjecture and discuss its proof. 
Fri Apr 03 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Apr 03 
Probability Seminar2:30pm  Vincent Hall 213Probability Seminar 
Fri Apr 03 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Apr 03 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Apr 03 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar TBA 
Thu Apr 02 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Apr 02 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Thu Apr 02 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Symplectic Topology 
Wed Apr 01 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Wed Apr 01 
PDE Seminar3:35pm  Vincent Hall 570 ,PDE Seminar  Cancelled 
Tue Mar 31 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Mar 31 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Mar 31 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Mar 31 
IMA Data Science Lab Seminar1:25pm  Lind 305LECTURE CANCELED ,  
Tue Mar 31 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Mar 30 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Mar 30 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon Mar 30 
Analysis and PDE Working Seminar3:35pm  Zoom link. https://umn.zoom.us/j/881291791Mathematical foundations of slender body theory Laurel Ohm Abstract:Slender body theory (SBT) facilitates computational simulations of thin filaments in a 3D viscous fluid by approximating the hydrodynamic effect of each fiber as the flow due to a line force density along a 1D curve. Despite the popularity of SBT in computational models, there had been no rigorous analysis of the error in using SBT to approximate the interaction of a thin fiber with fluid. In this talk, we develop a PDE framework for analyzing the error introduced by this approximation. In particular, given a 1D force along the fiber centerline, we define a notion of true solution to the full 3D slender body problem and obtain an error estimate for SBT in terms of the fiber radius. This places slender body theory on firm theoretical footing. We also present similar estimates in case of freeended and rigid filaments. 
Mon Mar 30 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Mar 30 
Student Number Theory Seminar3:25pm  Vincent Hall 570Student Number Theory Seminar 
Mon Mar 30 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Mar 27 
MCFAM Seminar5:30pm  Vincent Hall 16Social Determinants of Health Shae Armstrong, Optum Abstract: 
Fri Mar 27 
MCFAM Seminar5:30pm  Vincent Hall 16No MCFAM Seminar 
Fri Mar 27 
Combinatorics Seminar3:35pm  Via Virtual  ZoomCounting trees and nilpotent endomorphisms Vic Reiner Abstract:A formula of Cayley (1889) says that the number of trees on vertex set [n]:={1,2,...,n} is n^{n2}. Among its many proofs, my favorite is a gorgeous bijection due to Andre Joyal in 1981. One can also view Cayley's formula as asserting that there are n^{n1} vertexrooted trees on [n], or equivalently n^{n1} eventually constant selfmaps on [n]. This talk will review Joyal's proof, and its recent revisitation by Tom Leinster in arXiv:1912.12562. Leinster gives a beautiful qanalogue of the proof, that proves a qanalogous theorem of Fine and Herstein (1958). The latter theorem counts those linear selfmaps of an ndimensional vector space over a finite field F_q which are eventually constant, that is, nilpotent as linear maps. 
Fri Mar 27 
Analysis and PDE Working Seminar3:35pm  Vincent Hall 6Analysis and PDE Working Seminar 
Fri Mar 27 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Mar 27 
Probability Seminar2:30pm  Vincent Hall 213Probability Seminar 
Fri Mar 27 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Mar 27 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305CANCELEDThe Technical and Organizational Challenges of Data Science Catherine (Katy) Micek, 3M Abstract:In October 2012 shortly after I began my career in the data science space the Harvard Catherine (Katy) Micek is a Data Scientist at 3M in St. Paul, Minnesota. She holds a Ph.D. 
Fri Mar 27 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Mar 27 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar TBA 
Thu Mar 26 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Mar 26 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Thu Mar 26 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Symplectic Topology 
Wed Mar 25 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Wed Mar 25 
PDE Seminar3:35pm  Vincent Hall 570 ,PDE Seminar  Cancelled 
Tue Mar 24 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Mar 24 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Mar 24 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Mar 24 
IMA Data Science Lab Seminar1:25pm  Lind 305CANCELEDKernel Approaches in Global Statistical Distances, Local Measure Detection, and Active Learning ,  Abstract:In this talk, we'll discuss the problem of constructing meaningful distances between probability distributions given only finite samples from each distribution. We approach this through the use of dataadaptive and localized kernels, and in a variety of contexts. First, we construct locally adaptive kernels to define fast pairwise distances between distributions, with applications to unsupervised clustering. Then, we construct localized kernels to determine a statistical framework for determining where two distributions differ, with applications to measure detection for generative models. Finally, we'll begin to address the question of measure detection without a priori known labels of which distribution a point came from. This is addressed through active learning, in which one can choose a small number of points at which to query a label. This is ongoing work with Xiuyuan Cheng (Duke) and Hrushikesh Mhaskar (CGU), among others. Alex Cloninger is an Assistant Professor in the Mathematics Department and the Hal?c?o?lu Data Science Institute at UCSD. He received his PhD in Applied Mathematics and Scientific Computation from the University of Maryland in 2014, and was then an NSF Postdoc and Gibbs Assistant Professor of Mathematics at Yale University until 2017, when he joined UCSD. Alex researches problems around the analysis of high dimensional data. He focuses on approaches that model the data as being locally lower dimensional, including data concentrated near manifolds or subspaces. These types of problems arise in a number of scientific disciplines, including imaging, medicine, and artificial intelligence, and the techniques developed relate to a number of machine learning and statistical algorithms, including deep learning, network analysis, and measuring distances between probability distributions. 
Tue Mar 24 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Mar 23 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Mar 23 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon Mar 23 
Analysis and PDE Working Seminar3:35pm  Vincent Hall 6Analysis & PDE Working Seminar 
Mon Mar 23 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Mar 23 
Student Number Theory Seminar3:25pm  Vincent Hall 570Student Number Theory Seminar 
Mon Mar 23 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Mar 20 
MCFAM Seminar5:30pm  Vincent Hall 16MCFAM Seminar  No Seminar 
Fri Mar 20 
Combinatorics Seminar3:35pm  Vincent Hall 570Combinatorics Seminar  Cancelled Gabriel Frieden 
Fri Mar 20 
Analysis and PDE Working Seminar3:35pm  Vincent Hall 6Analysis and PDE Working Seminar 
Fri Mar 20 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Mar 20 
Probability Seminar2:30pm  Vincent Hall 213Probability Seminar 
Fri Mar 20 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Mar 20 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305LECTURE CANCELED Julie Thompson, Boston Scientific 
Fri Mar 20 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Mar 20 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar  Cancelled 
Thu Mar 19 
Colloquium3:35pm  Vincent Hall 16Cancelled  Multiscale Geometric Methods for highdimensional data near > lowdimensional sets Colloquium Cancelled 
Thu Mar 19 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Mar 19 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Thu Mar 19 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Symplectic Topology 
Wed Mar 18 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory  Cancelled Seminar Cancelled 
Wed Mar 18 
PDE Seminar3:35pm  Vincent Hall 570 ,PDE Seminar  Cancelled Seminar Cancelled 
Tue Mar 17 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Mar 17 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Mar 17 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Mar 17 
IMA Data Science Lab Seminar1:25pm  Lind 305CANCELEDLearning and Geometry for Stochastic Dynamical Systems in High Dimensions ,  Abstract:We discuss geometrybased statistical learning techniques for performing model reduction and modeling of certain classes of stochastic highdimensional dynamical systems. We consider two complementary settings. In the first one, we are given long trajectories of a system, e.g. from molecular dynamics, and we estimate, in a robust fashion, an effective number of degrees of freedom of the system, which may vary in the state space of then system, and a local scale where the dynamics is wellapproximated by a reduced dynamics with a small number of degrees of freedom. We then use these ideas to produce an approximation to the generator of the system and obtain, via eigenfunctions of an empirical FokkerPlanck equation (constructed from data), reaction coordinates for the system that capture the large time behavior of the dynamics. We present various examples from molecular dynamics illustrating these ideas. In the second setting we only have access to a (large number of expensive) simulators that can return short paths of the stochastic system, and introduce a statistical learning framework for estimating local approximations to the system, that can be (automatically) pieced together to form a fast global reduced model for the system, called ATLAS. ATLAS is guaranteed to be accurate (in the sense of producing stochastic paths whose distribution is close to that of paths generated by the original system) not only at small time scales, but also at large time scales, under suitable assumptions on the dynamics. We discuss applications to homogenization of rough diffusions in low and high dimensions, as well as relatively simple systems with separations of time scales, and deterministic chaotic systems in highdimensions, that are wellapproximated by effective stochastic diffusionlike equations. 
Tue Mar 17 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Mar 16 
Applied and Computational Math Colloquium3:35pm  TBAApplied and Computational Math Colloquium Mauro Maggioni, Johns Hopkins 
Mon Mar 16 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium  Cancelled Colloquium Cancelled 
Mon Mar 16 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon Mar 16 
Analysis and PDE Working Seminar3:35pm  Vincent Hall 6Analysis and PDE Working Seminar  Rescheduled for March 27 
Mon Mar 16 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Mar 16 
Student Number Theory Seminar3:25pm  Vincent Hall 570Student Number Theory Seminar 
Mon Mar 16 
Topology Seminar2:30pm  VinH 364Topology Seminar  TBA Marcy Robertson, University of Melbourne Abstract:TBA 
Mon Mar 16 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Mar 13 
Combinatorics Seminar3:35pm  Vincent Hall 570Combinatorics Seminar No Seminar  Spring Break 
Fri Mar 13 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Mar 13 
Probability Seminar2:30pm  Vincent Hall 213Probability Seminar 
Fri Mar 13 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Mar 13 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Mar 13 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar No Seminar 
Thu Mar 12 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Mar 12 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Thu Mar 12 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Symplectic Topology 
Wed Mar 11 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Tue Mar 10 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Mar 10 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Mar 10 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Mar 10 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Mar 09 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Mar 09 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon Mar 09 
Analysis and PDE Working Seminar3:35pm  Vincent Hall 6Analysis & PDE Working Seminar 
Mon Mar 09 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Mar 09 
Student Number Theory Seminar3:25pm  Vincent Hall 570Student Number Theory Seminar 
Mon Mar 09 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Mar 06 
Combinatorics Seminar3:35pm  Vincent Hall 570Grothendieck Polynomials from Chromatic Lattice Models Katy Weber Abstract:The Grothendieck polynomials are simultaneous generalizations of Schubert and Grothendieck polynomials that arise in the study of the connective Ktheory of the flag variety. They can be calculated as a generating function of combinatorial objects known as pipe dreams, as well as recursively via geometricallymotivated divided difference operators. We combine these two points of view by defining a chromatic lattice model whose partition function is a Grothendieck polynomial. This is joint workinprogress with Ben Brubaker, Claire Frechette, Andy Hardt, and Emily Tibor. 
Fri Mar 06 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Mar 06 
Probability Seminar2:30pm  Vincent Hall 213Dynamics of Deep Neural Networks and Neural Tangent Hierarchy Jiaoyang Huang, Institute for Advanced Study Abstract:The evolution of a deep neural network trained by the gradient descent can be described by its neural tangent kernel (NTK) as introduced by Jacot et al., where it was proven that in the infinite width limit the NTK converges to an explicit limiting kernel and it stays constant during training. The NTK was also implicit in many other recent papers. In the overparametrization regime, a fullytrained deep neural network is indeed equivalent to the kernel regression predictor using the limiting NTK. And the gradient descent achieves zero training loss for a deep overparameterized neural network. However, it was observed by Arora et al. that there is a performance gap between the kernel regression using the limiting NTK and the deep neural networks. This performance gap is likely to originate from the change of the NTK along training due to the finite width effect. The change of the NTK along the training is central to describe the generalization features of deep neural networks.In the work, we study the dynamic of the NTK for finite width deep fullyconnected neural networks. We derive an infinite hierarchy of ordinary differential equations, the neural tangent hierarchy (NTH) which captures the gradient descent dynamic of the deep neural network. Moreover, under certain conditions on the neural network width and the data set dimension, we prove that the truncated hierarchy of NTH approximates the dynamic of the NTK up to arbitrary precision. This is a joint work with HorngTzer Yau. 
Fri Mar 06 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Mar 06 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Mar 06 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar No Seminar 
Thu Mar 05 
Colloquium3:35pm  Vincent Hall 16Cluster formation and selfassembly in stratified fluids: a novel mechanism for particulate aggregation Richard McLaughlin, UNC, Chapel HIll Abstract:The experimental and mathematical study of the motion of bodies immersed in fluids with variable concentration fields (e.g. temperature or salinity) is a problem of great interest in many applications, including delivery of chemicals in laminar microchannels, or in the distribution 
Thu Mar 05 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Thu Mar 05 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570An invitation to contact homology Erkao Bao, Scientist at the company Houzz in Palo Alto Abstract:Contact homology is an invariant of the contact structure, which is an odddimensional counterpart of a symplectic structure. It was proposed by Eliashberg, Givental and Hofer in 2000. The application of contact homology and its variants include distinguishing contact structures, knot invariants, the Weinstein conjecture and generalization, and calculating GromovWitten invariants. In this talk, I will start with the notion of contact structures, then give a heuristic definition of the contact homology as an infinite dimensional Morse homology, and finally explain the major difficulties to make the definition rigorous. This is a joint work with Ko Honda. 
Wed Mar 04 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Tue Mar 03 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Mar 03 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Mar 03 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Mar 03 
IMA Data Science Lab Seminar1:25pm  Lind 305Living 3D World Models Leveraging Crowd Sourced Data JanMichael Frahm, Facebook Abstract:Crowd sourced imagery (images and video) is the richest data source available for 3D reconstruction of the world. The tremendous amounts of available imagery provided by photo/video sharing web sites, not only covers the worlds appearance, but also reflects the temporal evolution of the world, and its dynamic parts. It has long been a goal of computer vision to obtain life like virtual models from such rich imagery. The major current research challenges are the scale of the data, e.g. the Yahoo 100 millionimage dataset (only presents a small fraction of what is needed to model our world), the diversity of data modalities (e.g. crowdsourced photos or satellite images), the robustness, the completeness of the registration, and the lack of data for dynamic elements. Specifically, we are currently facing significant challenges to process Internet scale crowd sourced imagery within a reasonable time frame given limited compute resources. This is particularly true as we move toward automatically creating content for virtual and augmented reality. The talk discusses the UNC groups work on highly efficient image registration for the reconstruction of static 3D models from worldscale photo collections on a single PC in the span of six days, as well as the groups related work on imagebased search to address the scalability. It will also discuss the efforts to overcome the challenges achieving registration completeness and robustness. Additionally, the groups work towards overcoming the lack of observations for the reconstruction of scene dynamics will be presented. This includes for example, reconstructing people and fountains, using crowdsourced Flickr imagery and videos to achieve the goal of bringing the 3D models to life will be presented. JanMichael Frahm is a research scientist manager at Facebook and a full professor at the University of North Carolina at Chapel Hill where he heads the 3D computer vision group. He received his Dr.Ing. in computer vision in 2005 from the ChristianAlbrechts University of Kiel, Germany. His dissertation, Camera SelfCalibration with Known Camera Orientation received the prize for the best Ph.D. dissertation of the year in CAUs College of Engineering. His Diploma in Computer Science is from the University of Lübeck. His research interests include a variety of topics on the intersection of computer vision, computer graphics, AR & VR, and robotics. He has over 100 peerreviewed publications, is a program chair f 
Tue Mar 03 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Mar 02 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Mar 02 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Equilibration of aggregationdiffusion equations with weak interaction forces Ruiwen Shu, University of Maryland Abstract:I will talk about the large time behavior of aggregationdiffusion equations. For one spatial dimension with certain assumptions on the interaction potential, the diffusion index $m$, and the initial data, we prove the convergence to the unique steady state as time goes to infinity (equilibration), with an explicit algebraic rate. The proof is based on a uniformintime bound on the first moment of the density distribution, combined with an energy dissipation rate estimate. This is the first result on the equilibration of aggregationdiffusion equations for a general class of weakly confining potentials $W(r)$: those satisfying $\lim_{r\rightarrow\infty}W(r)<\infty$. 
Mon Mar 02 
Analysis and PDE Working Seminar3:35pm  Vincent Hall 6Analysis & PDE Working Seminar 
Mon Mar 02 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Mar 02 
Student Number Theory Seminar3:25pm  Vincent Hall 570The Satake equivalence II: The geometric formulation John O'Brien Abstract:We continue our discussion of the Satake equivalence and Langlands dual groups with an introduction to the geometric Satake equivalence. The classical Satake isomorphism establishes an algebra isomorphism between the spherical Hecke algebra of one group G and the Grothendieck group of the category of representations of the dual. We wish for a stronger statementan equivalence of categories between a categorical analogue of the spherical Hecke algebra of G and the category of representations of the dual of G. The geometric Satake isomorphism establishes this equivalence, using the geometry of the affine Grassmannian of G to construct a suitable "spherical Hecke category" of G. In this talk, we discuss the affine Grassmannian and introduce the tools needed to understand the geometric Satake equivalence. 
Mon Mar 02 
Topology Seminar2:30pm  VinH 364Topology Seminar  TBA George Shabat, Russian State University for the Humanities Abstract:TBA 
Mon Mar 02 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Feb 28 
MCFAM Seminar5:30pm  Vincent Hall 16Environmental, Social and Governance (ESG) in Finance Through the Lens of a Quant Michael (Zicong) Zhang, Bloomberg LP Abstract:If you can't measure it, you can't manage it  Using math tricks in measuring ESG performance. 
Fri Feb 28 
Combinatorics Seminar3:35pm  Vincent Hall 570Generalized snake graphs from orbifolds Elizabeth Kelley Abstract:Cluster algebras, as originally defined by Fomin and Zelevinsky, are characterized by binomial exchange relations. A natural generalization of cluster algebras, due to Chekhov and Shapiro, allows the exchange relations to have arbitrarily many terms. A subset of these generalized cluster algebras can be associated with triangulations of orbifolds, analogous to the subset of ordinary cluster algebras associated with triangulated surfaces. We generalize MusikerSchifflerWilliams snake graph construction for this subset of generalized cluster algebras, yielding explicit combinatorial formulas for the cluster variables. We then show that our construction can be extended to give expansions for generalized arcs on triangulated orbifolds. This is joint work with Esther Banaian. 
Fri Feb 28 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Feb 28 
Probability Seminar2:30pm  Vincent Hall 213Complexity of high dimensional Gaussian random fields with isotropic increments Qiang Zeng, CUNY Abstract:The number of critical points (on the exponential scale) of a random function is a basic question and is commonly called complexity. The notion of locally isotropic random fields (a.k.a. random fields with isotropic increments) was introduced by Kolmogorov in the 1940s. Gaussian random fields on Ndimensional Euclidean spaces with isotropic increments were classified as isotropic case and nonisotropic case by Yaglom in the 1950s. In 2004, Fyodorov computed the large N limit (on the exponential scale) of expected number of critical points for isotropic Gaussian random fields. However, many natural models are not isotropic and only have isotropic increments, which creates new difficulty in understanding the complexity. In this talk, I will present some results on the large N behavior of complexity of nonisotropic Gaussian random fields with isotropic increments. Connection to random matrices will be explained. This talk is based on joint work with Antonio Auffinger (Northwestern University). 
Fri Feb 28 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Feb 28 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305Some Characteristics of Research in Finance Onur Ozyesil, Helm.ai Abstract:The talk will provide a "naive" depiction of general characteristics of research in finance, together with an attempt to classify various research problems/styles present, in order to give a rough understanding of the landscape of mathematical research in finance. Two examples of research problems will also be discussed to provide a more concrete picture of research problems of interest in the industry. 
Fri Feb 28 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Feb 28 
Commutative Algebra Seminar12:20pm  Vincent Hall 213$\tau$Factorization and $\tau$Elasticity Bethany Kubik, University of Minnesota, Duluth Abstract:A more generalized form of factorization, called $\tau$factorization, was introduced in 2011 by D.D. Anderson and J. Reinkoester. In $\tau$factorization, all factors of a factorization must belong to the same equivalence class modulo a fixed ideal. We discuss $\tau$factorization in small settings and $\tau$elasticity in a more general setting. 
Thu Feb 27 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Feb 27 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Wed Feb 26 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Wed Feb 26 
Analysis and PDE Working Seminar3:35pm  Vincent Hall 570Local stability of the critical FisherKPP front via resolvent expansions near the essential spectrum Montie Avery Abstract:We revisit the stability of the critical front in the FisherKPP equation, which travels with the linear spreading speed c = 2. We recover a celebrated result of Gallay with a new method, establishing stability of the critical front with optimal decay rate t^(3/2) as well as an asymptotic description of the perturbation of the front. Our approach is based on studying detailed regularity properties of the resolvent for this problem in algebraically weighted spaces near the branch point in the absolute spectrum, and renders the nonlinear analysis much simpler. We briefly further explore the relationship between the localization of perturbations and their decay rate. 
Tue Feb 25 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Feb 25 
Colloquium2:30pm  Vincent Hall 16Colloquium 
Tue Feb 25 
Dynamical Systems2:30pm  Vincent Hall 213Hyperbolic scattering in the Nbody problem Rick Moeckel, University of Minnesota Abstract:It is a classical result that in the Nbody problem with positive energy, all solutions are unbounded in both forward and backward time. If all of the mutual distances between the particles tend to infinity with nonzero speed, the solution in called purely hyperbolic. In this case there is a welldefined asymptotic shape of the configuration of N points. We consider the scattering problem for solutions which are purely hyperbolic in both forward and backward time: given an initial shape at time minus infinity, which final shapes at time plus infinity can be reached via purely hyperbolic motions ? I will describe some recent work on this problem using a variation on McGehee's blowup technique. After a change of coordinates and timescale we obtain a welldefined limiting flow at infinity and use it to get Chazytype asymptotic estimates on the positions of the bodies and to study scattering solutions near infinity. This is joint work with G. Yu, R. Montgomery and N. Duignan. 
Tue Feb 25 
IMA Data Science Lab Seminar1:25pm  Lind 305Making Small Spaces Feel Large: Practical Illusions in Virtual Reality Evan Rosenberg, University of Minnesota, Twin Cities Abstract:Over the next decade, immersive technologies have the potential to revolutionize how people communicate over distance, how they learn, train, and operate in challenging physical environments, and how they visualize, understand, and make decisions based on an evergrowing landscape of complex data. However, despite rapid technical advances over the past few years and no small amount of media hype, there are numerous theoretical and practical problems yet to be solved before virtual reality can catch up with our imaginations and make good on these promises. Locomotion is one of the most significant interaction challenges because body movement is constrained by the real world. When walking in VR, users may collide with walls or physical obstacles if they attempt to travel outside the boundaries of a "roomscale" space. In this talk, I will present a series of illusory techniques that can overcome these movement limitations by imperceptibly manipulating the laws of physics. This approach, known as redirected walking, has stunning potential to fool the senses. Through a series of formal studies, users have been convinced that were walking along a straight path while actually traveling in a circle, or that they were exploring impossibly large virtual environments within the footprint of a single realworld room. Additionally, I will discuss technical challenges for redirected walking systems and present novel algorithms that can automatically redirect users in complex physical spaces with obstacles. Evan Suma Rosenberg is an Assistant Professor in the Department of Computer Science and Engineering at the University of Minnesota. Previously, he was the Associate Director of the MxR Lab at the Institute for Creative Technologies and a Research Assistant Professor in the Department of Computer Science at the University of Southern California. His research interests are situated at the intersection of virtual/augmented reality and HCI, encompassing immersive technologies, 3D user interfaces, and spatial interaction techniques. He received his Ph.D. from the Department of Computer Science at the University of North Carolina at Charlotte in 2010. Dr. Suma Rosenberg's research has been recognized with multiple best paper awards and has been funded by NSF, ARL, ONR, and DARPA. Over the past decade, he has also directed the development of multiple publicly released free software projects and contributed to an opensource technology initiative that has had a majo 
Tue Feb 25 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Feb 24 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium  Canceled Canceled 
Mon Feb 24 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon Feb 24 
Student Number Theory Seminar3:35pm  Vincent Hall 570The Satake equivalence I: The classical formulation John O'Brien Abstract:When studying the representation theory of reductive groups, one runs into a mysterious phenomenon: a certain duality between certain groups. In 1963, Ichir? Satake gave one of the first attempts of 
Mon Feb 24 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Feb 24 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Feb 21 
MCFAM Seminar5:30pm  VinH 162020 Winter FM Modeling Workshop Presentations 2020 Financial Mathematics (FM) Modeling Workshop Graduate Students, University of Minnesota Abstract:Two teams of Financial Mathematics graduate students will present the results of their projects completed over an intensive 10day winter workshop. The first presentation will be on Data Analysis, Visualization and Statistical/Machine Learning Modeling for Mortgage Prepayment and Delinquency Rates. The Industry Mentor for this project , in attendance for the talk, was: He LuThe second presentation will be on Inflation Rate Curve Modeling. This project was led by Industry Mentor Matt Abroe. 
Fri Feb 21 
Combinatorics Seminar3:35pm  Vincent Hall 570Separable elements and splittings of Weyl groups Yibo Gao, MIT Abstract:We introduce separable elements in finite Weyl groups, generalizing the wellstudied class of separable permutations. They enjoy nice properties in the weak Bruhat order, enumerate faces of the graph associahedron of the corresponding Dynkin diagrams, and can be characterized by pattern avoidance in the sense of Billey and Postnikov. We then prove that the multiplication map W/V×V?WW/V×V?W for a generalized quotient of the symmetric group is always surjective when V is a principal order ideal, providing the first combinatorial proof of an inequality due originally to Sidorenko in 1991, answering an open problem of Morales, Pak, and Panova. We show that this multiplication map is a bijection if and only if V is an order ideal in the right weak order generated by a separable element, answering an open question of Björner and Wachs in 1988. This is joint work with Christian Gaetz. 
Fri Feb 21 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Feb 21 
Probability Seminar2:30pm  Vincent Hall 213Robust Representation for Graph Data Dongmian Zou, UMN Abstract:Modern data are usually highdimensional with noise and corruption. A useful representation of data has to be robust and address the data structure. In this talk, I will first present a class of robust models called the scattering transform that can be used to generated features from graph data. In graph scattering transforms, the representation is generated in an unsupervised manner based on graph wavelets. It is approximately invariant to permutations and stable to signal or graph manipulations. Numerical results show that it works effectively for classification and community detection problems. Next, I will address how the structure of data can be found using autoencoders. Indeed, in the framework of autoencoders, graph scattering transform can be applied to the important task of graph generation. Specifically, I will illustrate its application in generating molecular samples. 
Fri Feb 21 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Feb 21 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305Profiles of Math Careers in the Industry Martin Lacasse, ExxonMobil Abstract:While the majority of PhD students graduating in math and physics end up being employed by the industry, there is relatively little information of career opportunities in the industry being presented to students during their graduate studies. This presentation aims at providing some real examples of career paths for mathematicians in the industry, and describing specific problems being addressed by them. The talk is intended to be an informal discussion around how to better prepare oneself to address the challenges raised by pursuing a career in the industry. A FrenchCanadian native, Martin Lacasse completed undergraduate degrees in both chemistry (Montreal) and physics (Concordia) where he graduated first of his promotion. He then studied at McGill University where he earned a M.Sc. and a Ph.D. in Physics, studying problems in statistical mechanics related to critical phenomena and phase transitions using largescale computers. After his Ph.D., Lacasse moved to Princeton University for a joint postdoctoral fellowship with the Corporate Research Laboratory (CSR) of Exxon Research and Engineering. Shortly after in 1995, he joined the lab and worked on the thermodynamics of polymer interfaces and on the rheology of compressed emulsions. Lacasse is currently leading a team of researchers at CSR modeling the effects of induced seismicity during oil and gas production. His current research interests also include experimental design problems in the field of PDEconstrained optimization and the packing of nonspherical particles. Over the years, Lacasse has been recognized as a leader in highperformance computing. 
Fri Feb 21 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Feb 21 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar TBA 
Thu Feb 20 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Feb 20 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Wed Feb 19 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Tue Feb 18 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Feb 18 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Feb 18 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Feb 18 
IMA Data Science Lab Seminar1:25pm  Lind 305From Clustering with Graph Cuts to Isoperimetric Inequalities: Quantitative Convergence Rates of Cheeger Cuts on Data Clouds Nicolas Garcia Trillos, University of Wisconsin, Madison Abstract:Graph cuts have been studied for decades in the mathematics and computer science communities. For example, a celebrated result in optimization relates the cut minimization problem (under some membership constraints) with a maximum flow problem via the well known max flowmin cut duality theorem. Another very important problem formulated in the computer science community that uses graph cuts is motivated by data clustering: while direct minimization of a graph cut is reasonable as it penalizes the size of interfaces, the optimization is not able to rule out partitions of data into groups that are highly asymmetric in terms of size. In order to avoid trivial partitions, and provide a more reasonable clustering approach, the original optimization of graph cuts is modified by adding an extra balancing term to the objective function in either additive or multiplicative form. A canonical example, with historical motivation, is the so called Cheeger cut problem. Minimization of Cheeger cuts for data clustering is on the one hand intuitively motivated, but on the other, is a highly nonconvex optimization problem with a pessimistic NP hard label tamped on it (at least in a worst case scenario setting). Nevertheless, in the past decade or so, several algorithmic improvements made the minimization of Cheeger cuts more feasible, and at the same time there was a renewed interest in studying statistical properties of Cheeger cuts. New analytical ideas have provided new tools to attack problems that were elusive using classical approaches from statistics and statistical learning theory. Despite the advances, several questions remain unanswered. The purpose of this talk is to present some of these theoretical developments, with emphasis on new results where, for the first time, high probability converge rates of Cheeger cuts of proximity graphs over data clouds are deduced. These quantitative convergence rates are obtained by building bridges between the original clustering problem and another field within the mathematical analysis community that has seen enormous advancements in the past few years: quantitative isoperimetric inequalities. This connection serves as a metaphor for how the mathematical analyst may be able to contribute to answer theoretical questions in machine learning, and how one may be able to deduce statistical properties of solutions to learning optimization problems that have a continuum counterpart. 
Tue Feb 18 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Feb 17 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Feb 17 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Direct Sampling Algoritmis in Inverse Scattering Isaac Harris, Purdue University Abstract:In this talk, we will discuss a recent qualitative imaging method referred to as the Direct Sampling Method for inverse scattering. This method allows one to recover a scattering object by evaluating an imaging functional that is the innerproduct of the farfield data and a known function. It can be shown that the imaging functional is strictly positive in the scatterer and decays as the sampling point moves away from the scatterer. The analysis uses the factorization of the farfield operator and the FunkeHecke formula. This method can also be shown to be stable with respect to perturbations in the scattering data. We will discuss the inverse scattering problem for both acoustic and electromagnetic waves. 
Mon Feb 17 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Feb 17 
Student Number Theory Seminar3:25pm  Vincent Hall 570Student Number Theory Seminar 
Mon Feb 17 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Feb 14 
Combinatorics Seminar3:35pm  Vincent Hall 570Combinatorics of the doubledimer model Helen Jenne, Oregon Abstract:In this talk we will discuss a new result about the doubledimer model: under certain conditions, the partition function for doubledimer configurations of a planar bipartite graph satisfies an elegant recurrence, related to the DesnanotJacobi identity from linear algebra. A similar identity for the number of dimer configurations (or perfect matchings) of a graph was established nearly 20 years ago by Kuo 
Fri Feb 14 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Feb 14 
Probability Seminar2:30pm  Vincent Hall 213Order of Fluctuations of the SherringtonKirkpatrick Model at Critical Temperature WeiKuo Chen, UMN Abstract:I will discuss the order of fluctuations in the SherringtonKirkpatrick mean field spin glass model. In particular, I will focus on the predictions concerning the free energy and present an elementary approach for obtaining a logarithmic bound on its variance at the critical temperature. 
Fri Feb 14 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Feb 14 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Feb 14 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Tate Resolutions and Horrocks Splitting Criterion Mahrud Sayrafi , Abstract:I will talk about the two papers EisenbudFløystadSchreyer2003 and EisenbudErmanSchreyer2015 in which they introduce Tate resolutions for projective spaces and products of projective spaces. As an application, I will talk about Horrocks' criterion for vector bundles in those settings. 
Thu Feb 13 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Feb 13 
Special Events and Seminars2:30pm  Vincent Hall 570Vector Bundles on the Projective Space Mahrud Sayrafi, University of Minnesota Abstract:I will start with the basics of line bundles and vector bundles in commutative algebra, specifically over the projective space. This is an introduction for the talk on Friday at the Commutative Algebra Seminar about the Tate resolutions for projective spaces and products of projective spaces. 
Wed Feb 12 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Tue Feb 11 
Colloquium3:30pm  Vincent Hall 16Understanding maps between Riemann surfaces Felix Janda, Institute for Advanced Study in Princeton Abstract:Moduli spaces of Riemann surfaces are a fundamental object in algebraic geometry. Their geometry is rich and holds many outstanding mysteries. One way to probe genus g Riemann surfaces is to understand the maps they admit to the simplest Riemann surface, the Riemann sphere. In my talk, I will describe one facet of this approach, a formula for the double ramification cycle (joint work with R. Pandharipande, A. Pixton and D. Zvonkine). Along the way, we will see connections to combinatorics, number theory and symplectic geometry. 
Tue Feb 11 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Feb 11 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Feb 11 
IMA Data Science Lab Seminar1:25pm  Lind 305Function Space MetropolisHastings Algorithms with NonGaussian Priors Bamdad Hosseini, California Institute of Technology Abstract:MetropolisHastings (MH) algorithms are one of the most widely used methods for inference. In this talk we discuss some ideas for designing new MH algorithms that are reversible with I am a von Karman instructor in the Department of Computing and Mathematical Sciences at California Institute of Technology, sponsored by Prof. Andrew Stuart. Prior to that I received my Ph.D. in Applied and Computational Mathematics in the Department of Mathematics at Simon Fraser University with of Profs. Nilima Nigam and John Stockie. I work on problems at the interface of probability, statistics and applied mathematics with a particular focus on the analysis, development and application of computational methods for estimating parameters and quantifying uncertainty. 
Tue Feb 11 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Feb 10 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Feb 10 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon Feb 10 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Feb 10 
Student Number Theory Seminar3:25pm  Vincent Hall 570The Conditional Probability That an Elliptic Curve Has a Rational Subgroup of Order 5 or 7 Meagan Kenney Abstract:Let E be an elliptic curve over the rationals. Divisibility of the set of rational points on E by some integer m can occur locally or globally. If E has global divisibility by m, then E has local divisibility by m; however, work of Katz shows that the converse is only guaranteed up to isogeny. Cullinan and Voight showed that the probability than an elliptic curve has global divisibility by an integer m is nonzero for all integers m allowed by Mazur's classification of rational torsion on elliptic curves. In this talk, I will discuss the probability that E has global divisibility by 5 or 7, given that E has local divisibility by 5 or 7, respectively. 
Mon Feb 10 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Feb 07 
MCFAM Seminar5:30pm  Vincent Hall 16Pricing in Contractual Freight Compared to Finance Kaisa Taipale, C.H. Robinson Abstract:In this talk, I'll discuss the contractual freight business, in which a large shipper makes a contract with a company like CH Robinson to procure carriers (trucks) for their goods over the course of a year for a given rate, as opposed to using the volatile "spot" or transactional market. Because these yearlong contracts aren't legally binding, some shippers treat them more like an American option on the underlying price of freight, but this has gametheoretic economic consequences for the shipper! Dr. Taipale, Data Scientist at C.H. Robinson will also talk about the data science and mathematical skills that are important for her job at C.H. Robinson
Bio : https://www.linkedin.com/in/kaisataipale2630256/detail/contactinfo/ 
Fri Feb 07 
Combinatorics Seminar3:35pm  Vincent Hall 570Unconditional Reflexive Polytopes McCabe Olsen, Ohio State Abstract:A convex body is unconditional if it is symmetric with respect to reflections in all coordinate hyperplanes. In this paper, we investigate unconditional lattice polytopes with respect to geometric, combinatorial, and algebraic properties. In particular, we characterize unconditional reflexive polytopes in terms of perfect graphs. As a prime example, we study the signed Birkhoff polytope. Moreover, we derive constructions for Galedual pairs of polytopes and we explicitly describe Gröbner bases for unconditional reflexive polytopes coming from partially ordered sets. This is joint work with Florian Kohl (Aalto University) and Raman Sanyal (Goethe Universität Frankfurt). 
Fri Feb 07 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Feb 07 
Probability Seminar2:30pm  Vincent Hall 213Probability Seminar 
Fri Feb 07 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Feb 07 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Feb 07 
Commutative Algebra Seminar12:20pm  Vincent Hall 213On a question of Dutta, joint with Linquan Ma and Anurag Singh Uli Walther, Purdue Abstract:For a local ring (A,m) of dimension n,we study the natural map from the nth Koszul cohomology on a minimal set of generators of m to the top local cohomology of A supported at m. We construct complete normal domains for which this map is zero, thus answering a question of Dutta in the negative. If time permits, we present precise information on the kernel of this map for a large class of StanleyReisner rings. 
Thu Feb 06 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Feb 06 
Special Events and Seminars2:30pm  Vincent Hall 570Student Commutative Algebra Seminar 
Wed Feb 05 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Tue Feb 04 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Feb 04 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Feb 04 
Dynamical Systems2:30pm  Vincent Hall 213Spectral Stability, the Maslov Index, and Spatial Dynamics Margaret Beck, Boston University Abstract:Understanding the spectral stability of solutions to partial differential equations is an important step in predicting longtime dynamics. Recently, it has been shown that a topological invariant known as the Maslov Index can play an important role in determining spectral stability for systems that have a symplectic structure. In addition, related ideas have lead to a suggested generalization of the notion of spatial dynamics to general, multidimensional spatial domains. In this talk, the notions of spectral stability, the Maslov Index, and spatial dynamics will be introduced and an overview of recent results will be given. 
Tue Feb 04 
IMA Data Science Lab Seminar1:25pm  Lind 305Different Aspects of Registration Problem Yuehaw Khoo, University of Chicago Abstract:In this talk, we discuss several variants of the rigid registration problem, i.e aligning objects via rigid transformation. In the simplest scenario of pointset registration where the correspondence between points are known, we investigate the robustness of registration to outliers. We also study a convex programming formulation of pointset registration with exact recovery, in the situation where both the correspondence and alignment are unknowns. Lastly, an important registration problem arises in Cryoelectron microscopy for protein structuring will be discussed. This talk is based on joint works with Ankur Kapoor, Joe Kileel, Boris Landa, Cindy Orozco, Amit Singer, Nir Sharon, and Lexing Ying. Yuehaw Khoo is an assistant professor in the statistics department of University of Chicago. Prior to this, he was a postdoc in Stanford and graduate student in Princeton. He is interested in scientific computing problems in protein structure determination and quantum manybody physics. In these problems, he focuses on nonconvex, discrete or large scale optimization and representing highdimensional functions using neuralnetwork and tensor network. 
Tue Feb 04 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Feb 03 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207On the final frontiers in computational mathematics Anders Hansen, Cambridge Abstract:Core problems in computational mathematics include computing spectra of operators, solutions to linear PDEs, convex optimisation problems etc., and these areas have been intensely investigated over the last half century. However, there are still fundamental open problems. For example, despite more than 90 years of quantum mechanics, it is still unknown whether it is possible to compute spectra of Schrodinger operators with bounded potentials. Moreover, how to compute minimisers of linear programs (LP) with rational inputs has been known since the 1950s, however, what happens if the input is irrational? Can one accurately compute minimisers of LPs if, as in compressed sensing, the matrix has rows from the discrete cosine transform? Furthermore, do there exist algorithms that can handle all linear Schrodinger PDEs? And, if not, which can be handled and which can never be solved? We will discuss solutions to many of these open problems and provide some potentially surprising results. For example, despite being open for decades, the problem of computing spectra of Schrodinger operators with bounded potentials is not harder than computing spectra of diagonal infinite matrices, the easiest of computational spectral problems. Moreover, for LPs with irrational inputs we have the following phenomenon. For any integer K > 2 there exists a class of well conditioned inputs so that no algorithm can compute K correct digits of a minimiser, however, there exists an algorithm that can compute K1 correct digits. But any algorithm producing K1 correct digits will need arbitrarily long time. Finally, computing K2 correct digits can be done in polynomial time in the number of variables. 
Mon Feb 03 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311Applied and Computational Mathematics Seminar 
Mon Feb 03 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Feb 03 
Student Number Theory Seminar3:25pm  Vincent Hall 570Selfadjoint operators and zeta function Paul Garrett Abstract:One hundred years ago, when the theory of selfadjoint operators was 
Mon Feb 03 
Topology Seminar2:30pm  Vincent Hall 311Topology Seminar 
Fri Jan 31 
Combinatorics Seminar3:35pm  Vincent Hall 570Weak order and descents for monotone triangles Vic Reiner Abstract:(joint work with Zach Hamaker; arXiv:1809.1057) Monotone triangles are combinatorial objects in bijection with alternating sign matrices, a fascinating generalization of permutation matrices. We will review this connection, and the fact that strong Bruhat order on permutations has a natural extension to monotone triangles. We will then explain an analogous extension of the weak Bruhat order on permutations to monotone triangles. This comes from extending the notions of descents in permutations and the "bubblesorting" action of the 0Hecke algebra on permutations to monotone triangles. We will also explain one of our motivations: to give a natural family of shellings for Terwilliger's recently defined order on subsets. 
Fri Jan 31 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Jan 31 
Probability Seminar2:30pm  Vincent Hall 213Nearcritical avalanches in 2D frozen percolation and forest fires WaiKit Lam, UMN Abstract:We consider (volume)frozen percolation on the triangular lattice. The model can be described informally as follows. Fix a large integer $N$. Initially, all vertices are vacant. We let clusters grow (vertices become occupied) as long as their volume is strictly smaller than $N$, and they stop growing (they "freeze") when their volume becomes at least $N$. A vertex $v$ is frozen if it belongs to an occupied cluster with volume at least $N$. In this model, there exists a sequence of "exceptional scales" $(m_k(N))$: roughly speaking, if we consider frozen percolation in a box of side length $m_k(N)$, then as $N\to\infty$, the probability that $0$ is frozen in the final configuration is bounded away from $0$; while if we consider the process in a box of side length that is far from $m_k(N)$ and $m_{k+1}(N)$ (but between them), then as $N\to\infty$, the corresponding probability will go to $0$. The limiting exception scale, $m_\infty(N)$, is not studied and almost nothing is known. In an ongoing project with Pierre Nolin, we show that if we consider the process in a box of side length $m_\infty(N)$, then there are "avalanches" of freezings: the number of frozen circuits surrounding the origin divided by $\log\log{N}$ converges to an explicit constant in probability. If time allows, I will also talk about the analogous result in the forest fire process. 
Fri Jan 31 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Jan 31 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305How NextEra Analytics Applies Math to Problems in Coupled Renewable and Energy Storage Systems Madeline Handschy, NextEra Analytics Inc Abstract:Renewable energy sources  solar and wind  are inherently variable, and unlike a traditional power plant, energy generation can't be 'turned up' or 'turned down' at will. In the past several years, the rapidly falling price of Lithium Ion batteries and related technology has made it more feasible than ever to build solar or wind farms coupled with energy storage capabilities to mitigate some of the variability of the renewable resource and provide more control over the energy output of the farm. In this talk, I will give an overview of working at NextEra Analytics and give examples of how we are applying math to operate energy storage projects as well as evaluate potential new renewable + energy storage hybrid projects. Madeline graduated in May from the University of Minnesota with a PhD in Mathematics coadvised by Drs. Gilad Lerman and WeiKuo Chen. She started in the Applied Math Group at NextEra Analytics in June and works primarily on math related to energy storage. 
Fri Jan 31 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Jan 31 
Commutative Algebra Seminar12:20pm  Vincent Hall 213Commutative Algebra Seminar 
Thu Jan 30 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Wed Jan 29 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Tue Jan 28 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Jan 28 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Jan 28 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Jan 28 
IMA Data Science Lab Seminar1:25pm  Lind 409Machine Learning Meets Societal Values Steven Wu, University of Minnesota, Twin Cities Abstract:The vast collection of detailed personal data has enabled machine learning to have a tremendous impact on society. Algorithms now provide predictions and insights that are used to make or inform consequential decisions on people. Concerns have been raised that our heavy reliance on personal data and machine learning might compromise peoples privacy, produce new forms of discrimination, and violate other kinds of social norms. My research seeks to address this emerging tension between machine learning and society by focusing on two interconnected questions: 1) how to make machine learning better aligned with societal values, especially privacy and fairness, and 2) how to make machine learning methods more reliable and robust in social and economic dynamics. In this talk, I will provide an overview of my research and highlight some of my recent work on fairness in machine learning and differentially private synthetic data generation. Steven Wu is an Assistant Professor of Computer Science and Engineering at the University of Minnesota. His research interests are in algorithms and machine learning, with a focus on privacypreserving data analysis, algorithmic fairness, and algorithmic economics. From 2017 to 2018, he was a postdoc researcher at Microsoft ResearchNew York City in the Machine Learning and Algorithmic Economics groups. In 2017, he received his Ph.D. in computer science under the supervision of Michael Kearns and Aaron Roth at the University of Pennsylvania, where his doctoral dissertation received Penns Morris and Dorothy Rubinoff Award for best thesis. His research is supported by an Amazon Research Award, a Facebook Research Award, a Mozilla research grant, a Google Faculty Research Award, a J.P. Morgan Research Faculty Award, and the National Science Foundation. 
Tue Jan 28 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Jan 27 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Jan 27 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 311An inverse problem on Light Sheet Fluorescence Microscopy Benjamin Palacios, University of Chicago Abstract:In Light Sheet Fluorescence Microscopy a density of fluorescent material (fluorophores) needs to be reconstructed through a process that consists in the application of a thin sheet of light that stimulates fluorophores, inducing the emission of fluorescent light that is recorderded and which constitute our measurements. In this talk I will present a mathematical model for this twostep process as well as the inverse problem arising from it. Uniqueness and stability of the inverse problem will be discussed. 
Mon Jan 27 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jan 27 
Student Number Theory Seminar3:25pm  Vincent Hall 570Student Number Theory Seminar 
Mon Jan 27 
Topology Seminar2:30pm  Vincent Hall 311Smooth 4manifolds and the geometry of 3manifolds Matthew Stoffregen, MIT Abstract:One of the interests of lowdimensional topologists is 
Fri Jan 24 
MCFAM Seminar5:30pm  Vincent Hall 16U of MN Women in Math and Stats Graduate Team  2019 MinneMUDAC Award Winning Analytics Presentation on Commodity Pricing Cora Brown, Somyi Baek, Sarah Milstein, and Yu Yang, University of Minnesota Abstract:University of Minnesota mathematics and statistics graduate students formed a team called "Women in Math and Stats" and competed in the MinneMUDAC 2019 Challenge. They took 2nd place in a field of 24 teams in the graduate division of the challenge. They also received the Analytic Acumen Award for the 2nd year in a row. This years challenge required students to analyze a variety of data to predict trends in soybean prices. Teams were evaluated based on a number of factors, including data preparation, team synergy, and communication of results. Teams in the Undergraduate and Graduate divisions were also scored on the accuracy of their predictions. The challenge and data were curated by Farm Femmes. We firmly believe that investing in the next generation grows the future, said Karen Hildebrand, CoFounder of Farm Femmes. Some days the seeds we plant are literal as farmers, but MinneMUDAC gave us the opportunity to grow the knowledge of agriculture and agtech.Members of the team who will presenting include: Cora Brown, Somyi Baek, Sarah Milstein, and Yu Yang. Their faculty advisor was Dr. Gilad Lerman. 
Fri Jan 24 
Lie Theory Seminar3:30pm  Vincent Hall 209Lie Theory Seminar 
Fri Jan 24 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 364Reading Seminar on Automorphic Forms 
Fri Jan 24 
Special Events and Seminars1:00pm  Vincent Hall 301pAdic Cohomology, Exponential Sums, and Hypergeometric Functions 
Fri Jan 24 
Commutative Algebra Seminar12:20pm  VinH 203ACommutative Algebra Seminar 
Thu Jan 23 
Colloquium3:35pm  Vincent Hall 16Modularity and the Hodge/Tate conjectures for some selfproducts Laure Flapan, MIT Abstract:If X is a smooth projective variety over a number field, the Hodge and Tate conjectures describe how information about the subvarieties of X is encoded in the cohomology of X. We explore the role that certain automorphic representations, called algebraic Hecke characters, can play in understanding which cohomology classes of X arise from subvarieties. We use this to deduce the Hodge and Tate conjectures for certain selfproducts of varieties, including some selfproducts of K3 surfaces. This is joint work with J. Lang. 
Wed Jan 22 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 207Automorphic Forms and Number Theory 
Tue Jan 21 
Colloquium3:30pm  Vincent Hall 16Optimal Transport as a Tool in Analytic Number Theory and PDEs Stefan Steinerberger, Yale University Abstract:Optimal Transport is concerned with the question of how to best move one measure to another (this could be sand on a beach or products from a warehouse to consumers). I will explain the basic definition of Wasserstein distance and then describe how it can be used as a tool to say interesting things in other fields. (1) How to get new regularity statements for classical objects in number theory almost for free (irrational rotations on the torus, quadratic residues in finite fields). (2) How to best distribute coffee shops over downtown Minneapolis. (3) Finally, how to obtain higher dimensional analogues of classical SturmLiouville theory: simply put, SturmLiouville theory says that eigenfunctions of the operator Ly = y''(x) +p(x)y(x) (think of sin(kx) and cos(kx)) cannot have an arbitrary number of roots; we present a generalization to higher dimensions that is based on a simple (geometric) inequality. 
Tue Jan 21 
Special Events and Seminars3:30pm  Vincent Hall 364Arithmetic Geometry Seminar 
Tue Jan 21 
Dynamical Systems2:30pm  Vincent Hall 213Dynamical Systems Seminar 
Tue Jan 21 
IMA Data Science Lab Seminar1:25pm  Lind 305Linear Unbalanced Optimal Transport Matthew Thorpe, University of Cambridge Abstract:Optimal transport is a powerful tool for measuring the distances between This is joint work with Bernhard Schmitzer (TU Munich). Matthew is a research fellow in the Cantab Capital Institute for the 
Tue Jan 21 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Jan 20 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Tue Jan 14 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Jan 13 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Tue Jan 07 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Jan 06 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Tue Dec 31 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Dec 30 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Tue Dec 24 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Dec 23 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Fri Dec 20 
Combinatorics Seminar3:30pm  Vincent Hall 570Combinatorics Seminar 
Fri Dec 20 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Thu Dec 19 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Dec 19 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar TBA 
Thu Dec 19 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Wed Dec 18 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Dec 18 
PDE Seminar3:35pm  Vincent Hall 570PDE Seminar 
Tue Dec 17 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Dec 17 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Tue Dec 17 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Dec 16 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Dec 16 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Dec 16 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Dec 13 
Combinatorics Seminar3:30pm  Vincent Hall 570Combinatorics Seminar No Seminar  Final Exams 
Fri Dec 13 
Probability Seminar2:30pm  Vincent Hall 311Probability Seminar 
Fri Dec 13 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Dec 13 
Special Events and Seminars1:25pm  Vincent Hall 213"pAdic Cohomology, Exponential Sums, and Hypergeometric Functions TBA 
Thu Dec 12 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Dec 12 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Dec 12 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar TBA 
Thu Dec 12 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar 
Thu Dec 12 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Wed Dec 11 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Dec 11 
PDE Seminar3:35pm  Vincent Hall 570Quantitative stochastic homogenization via Malliavin calculus Antoine Gloria, Sorbonne Université Abstract:Abstract: This talk is about stochastic homogenization of linear elliptic equations in divergence form. Let $a(x)=h(G(x))$ be a diffusion coefficient field, where $h$ is a Lipschitz function and $G$ is a Gaussian field (with possibly thick tail). Solutions $u_\varepsilon$ of elliptic equations $\nabla \cdot a(\cdot/\varepsilon) \nabla u_\varepsilon = \nabla \cdot f$ in $\mathbb R^d$ with such random heterogeneous coefficients $a$ both oscillate spatially and fluctuate randomly at scale $\varepsilon >0$. I will show how suitable quantitative twoscale expansions allow one to reduce the analysis of oscillations and fluctuations of solutions to bounds on the corrector and fluctuations of the homogenization commutator, respectively. The main probabilistic ingredient is Malliavin calculus, and the main analytical ingredient is largescale elliptic regularity. This is based on joint works with Mitia Duerinckx, Julian Fischer, Stefan Neukamm, and Felix Otto. 
Wed Dec 11 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Automorphic Forms and Number Theory 
Tue Dec 10 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Dec 10 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Dec 10 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Dec 10 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology Seminar TBA 
Tue Dec 10 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Dec 09 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Gradient Flows: From PDE to Data Analysis Franca Hoffman, Caltech Abstract:Certain diffusive PDEs can be viewed as infinitedimensional gradient flows. This fact has led to the development of new tools in various areas of mathematics ranging from PDE theory to data science. In this talk, we focus on two different directions: modeldriven approaches and datadriven approaches. 
Mon Dec 09 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Applied and Computational Mathematics Seminar 
Mon Dec 09 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Dec 09 
Topology Seminar2:30pm  Ford Hall 110Topology Seminar TBA 
Mon Dec 09 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Dec 06 
MCFAM Seminar5:30pm  Vincent Hall 16GUN VIOLENCE: ACTUARIAL ANALYSIS AND MATHEMATICAL MODELING Kristen Moore, University of Michigan Abstract:Firearm deaths and injuries are a significant problem in the United States. Indeed, the American Medical Association recently called firearm violence a public health crisis and called for a comprehensive public health response and solution. Gun violence in America exacts a significant toll on our society in both human and economic terms. Some argue that Americans have a moral obligation to address the issue of gun violence. But even from a more concrete perspective, the economic cost of firearms directly impacts the financial outcomes of insurers and taxpayers. There is a clear need for unbiased and objective research on the societal and economic impact of firearms. Actuaries are well positioned to study the mortality and morbidity related to firearms, both to quantify the risk and to inform governmental and public health interventions to mitigate the risk associated with firearms. Yet there is little on the topic in the actuarial and insurance literature. In this talk, I will provide a brief overview on the scope of firearm deaths and injuries and examine the extent to which actuaries and insurance professionals have studied or addressed the issue. I will compare firearm risk to risks that are considered in the underwriting process for life and homeowners insurance. I will describe some existing insurance products related to firearm risk as well as proposed legislation regarding gun liability insurance. In a different vein, if time permits, I will discuss preliminary work on a dynamical systems model of gun violence within a population. We are studying how, in an idealized model, changes to various policy parameters affect the longterm behavior of a system. Finally, I will describe some of the many open questions related to gun violence that are amenable to study by actuaries and mathematicians. Bio: https://sites.lsa.umich.edu/ksmoore/ 
Fri Dec 06 
Lie Theory Seminar3:35pm  Vincent Hall 1Special modular forms on exceptional groups Aaron Pollack, Duke University Abstract:Classically, a Siegel modular form is said to be singular or distinguished if many of its Fourier coefficients are 0, in a precise sense. I will explain the construction of singular and distinguished modular forms on the exceptional groups E_6, E_7, E_8. Moreover, time permitting, I will also explain an analogue of the SaitoKurokawa lift, which produces cusp forms on Spin(8) and the exceptional group G_2 out of holomorphic Siegel modular forms on Sp(4). 
Fri Dec 06 
Combinatorics Seminar3:30pm  Vincent Hall 570A noniterative formula for straightening fillings of Young diagrams Reuven Hodges, UIUC Abstract:Young diagrams are fundamental combinatorial objects in representation theory and algebraic geometry. Many constructions that rely on these objects depend on variations of a straightening process that expresses a filling of a Young diagram as a sum of semistandard tableaux subject to certain relations. It has been a longstanding open problem to give a noniterative formula for this straightening process. In this talk I will give such a formula. I will then use this noniterative formula give a proof that the coefficient of the leading term in the straightening is either 1 or 1, generalizing a theorem of Gonciulea and Lakshmibai. 
Fri Dec 06 
Probability Seminar2:30pm  Vincent Hall 311Gibbsian line ensembles and loggamma polymers Xuan Wu, Columbia University Abstract:In this talk we will first give an overview of the known 
Fri Dec 06 
Probability Seminar2:30pm  Vincent Hall 311Probability Seminar 
Fri Dec 06 
Math Biology Seminar2:30pm  VinH 209Math Biology Seminar 
Fri Dec 06 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Dec 06 
Special Events and Seminars1:25pm  Vincent Hall 213"pAdic Cohomology, Exponential Sums, and Hypergeometric Functions TBA 
Fri Dec 06 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305Lecture Whitney Moore, University of Minnesota, Twin Cities 
Fri Dec 06 
IMA Data Science Lab Seminar1:25pm  Lind 305Probabilistic Preference Learning with the Mallows Rank Model for Incomplete Data Arnoldo Frigessi, Oslo University Hospital Abstract:Personalized recommendations are useful to assist users in their choices in webbased market places, entertainment engines, information providers. Learning individual preferences is an important step. Users express their preferences by rating, ranking, (possibly inconsistently) comparing, liking and clicking items. Such data contain information about the individual users ranking of the items. Clickthrough data can be seen as (consistent) pair comparisons. The Mallows rank model allows to analyse rank data, but its computational complexity has limited its use to a particular form, based on Kendalls distance. We developed new computationally tractable methods for Bayesian inference in Mallows models that work with any rightinvariant distance. Our method performs inference on the latent consensus ranking of all items and on the individual latent rankings by Bayesian augmentation. Current popular recommendation algorithms are based on matrix factorisations, have high accuracy and achieve good clickthrough rates. However diversity of the recommended items is often poor and most algorithms do not produce interpretable uncertainty quantifications of the recommendations. With a simulation study and real life data examples, we demonstrate that compared to matrix factorisation approaches, our Bayesian Mallows method makes personalized recommendations mpared to matrix factorisation approaches, our Bayesian Mallows method makes personalized recommendations. Arnoldo Frigessi is professor of statistics at the University of Oslo, leads the Oslo Center for Biostatistics and Epidemiology and is director of BigInsight. BigInsight is a centre of excellence for researchbased innovation, a consortium of industry, business, public actors and academia, developing model based machine learning methodologies for big data. Originally from Italy, where he had positions in Rome and Venice, he moved to Norway in 2019 as a researcher at the Norwegian Computing Centre, before he became professor at the University of Oslo. Frigessi has developed statistical methodology motivated by specific problems in science, technology and industry. He has designed stochastic models to study principles, dynamics and patterns of complex dependence. Inference is usually based on computationally intensive stochastic algorithms. Currently, he has research collaborations in genomics, personalised therapy in cancer, infectious disease models, eHealth research, personalised and viral marketing, s 
Thu Dec 05 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Dec 05 
Colloquium3:35pm  Vincent Hall 16Modular forms on exceptional groups Aaron Pollack, Duke Abstract:When G is a reductive (noncompact) Lie group, one can consider automorphic forms for G. These are functions on the locally symmetric space X_G associated to G that satisfy some sort of nice differential equation. When X_G has the structure of a complex manifold, the _modular forms_ for the group G are those automorphic forms that correspond to holomorphic functions on X_G. They possess close ties to arithmetic and algebraic geometry. For certain exceptional Lie groups G, the locally symmetric space X_G is not a complex manifold, yet nevertheless possesses a very special class of automorphic functions that behave similarly to the holomorphic modular forms above. Building upon work of Gan, Gross, Savin, and Wallach, I will define these modular forms and explain what is known about them. 
Thu Dec 05 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar McCleary Philbin, University of Minnesota 
Thu Dec 05 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Einstein's gravity and stability of black holes PeiKen Hung, MIT Abstract:Though Einstein's fundamental theory of general relativity has already celebrated its one hundredth birthday, there are still many outstanding unsolved problems. The Kerr stability conjecture is one of the most important open problems, which posits that the Kerr metrics are stable solutions of the vacuum Einstein equation. Over the past decade, there have been huge advances towards this conjecture based on the study of wave equations in black hole spacetimes and structures in the Einstein equation. In this talk, I will discuss the recent progress in the stability problems with special focus on the wave gauge. 
Wed Dec 04 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Dec 04 
PDE Seminar3:35pm  Vincent Hall 570Multiscale analysis of Jordan curves Benjamin Jaye, Clemson University Abstract:In this talk we will describe how one can detect regularity in Jordan curves through analysis of associated geometric square functions. We will particularly focus on the resolution to a conjecture of L. Carleson. Joint work with Xavier Tolsa and Michele Villa (https://arxiv.org/abs/1909.08581). 
Wed Dec 04 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Automorphic Forms and Number Theory 
Tue Dec 03 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Dec 03 
Colloquium3:30pm  Vincent Hall 16Mirror symmetry and canonical bases for quantum cluster algebras Travis Mandel, Univ. of Edinburgh Abstract:Mirror symmetry is a phenomenon which relates the symplectic geometry of one space X to the algebraic geometry of another space Y. One consequence is that a canonical basis of regular functions on Y can be defined in terms of certain counts of holomorphic curves in X. I'll discuss the application of this to (quantum) cluster algebras  certain combinatorially defined algebras whose definition was motivated by the appearance of canonical bases in representation theory and Teichmüller theory. 
Tue Dec 03 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Dec 03 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Tue Dec 03 
IMA Data Science Lab Seminar1:25pm  Lind 305Exploiting Group and Geometric Structures for Massive Data Analysis Zhizhen (Jane) Zhao, University of Illinois at UrbanaChampaign Abstract:In this talk, I will introduce a new unsupervised learning framework for data points that lie on or close to a smooth manifold naturally equipped with a group action. In many applications, such as cryoelectron microscopy image analysis and shape analysis, the dataset of interest consists of images or shapes of potentially high spatial resolution, and admits a natural group action that plays the role of a nuisance or latent variable that needs to be quotient out before useful information is revealed. We define the pairwise groupinvariant distance and the corresponding optimal alignment. We construct a graph from the dataset, where each vertex represents a data point and the edges connect points with small groupinvariant distance. In addition, each edge is associated with the estimated optimal alignment group. Inspired by the vector diffusion maps proposed by Singer and Wu, we explore the cycle consistency of the group transformations under multiple irreducible representations to define new similarity measures for the data. Utilizing the representation theoretic mechanism, multiple associated vector bundles can be constructed over the orbit space, providing multiple views for learning the geometry of the underlying base manifold from noisy observations. I will introduce three approaches to systematically combine the information from different representations, and show that by exploring the redundancy created artificially across irreducible representations of the transformation group, we can get drastically improved nearest neighbor identification, when a large portion of the true edges are corrupted. I will also show the application in cryoelectron microscopy image analysis. 
Tue Dec 03 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar No Seminar 
Mon Dec 02 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Towards personalized computer simulation of breast cancer treatment Arnoldo Frigessi , University of Oslo Abstract:Current personalized cancer treatment is based on biomarkers which allow assigning each patient to a subtype of the disease, for which treatment has been established. Such stratifiedpatient treatments represent a first important step away from onesizefitsall treatment.However, the accuracy of disease classification comes short in the granularity of thepersonalization: it assigns patients to one of a few classes, within which heterogeneity inresponse to therapy usually is still very large. In addition, the combinatorial explosivequantity of combinations of cancer drugs, doses and regimens, makes clinical testingimpossible. We propose a new strategy for personalised cancer therapy, based on producing acopy of the patients tumour in a computer, and to expose this synthetic copy to multiplepotential therapies. We show how mechanistic mathematical modelling, patient specificinference and simulation can be used to predict the effect of combination therapies in a breastcancer. The model accounts for complex interactions at the cellular and molecular level, andis able of bridging multiple spatial and temporal scales. The model is a combination ofordinary and partial differential equations, cellular automata and stochastic elements. Themodel is personalised by estimating multiple parameters from individual patient data,routinely acquired, including histopathology, imaging and molecular profiling. The resultsshow that mathematical models can be personalized to predict the effect of therapies in eachspecific patient. The approach is tested with data from five breast tumours collected in arecent neoadjuvant clinical phase II trial. The model predicted correctly the outcome after 12weeks treatment and showed by simulation how alternative treatment protocols would haveproduced different, and some times better, outcomes. This study is possibly the first onetowards personalized computer simulation of breast cancer treatment incorporating relevantbiologicallyspecific mechanisms and multitype individual patient data in a mechanistic andmultiscale manner: a first step towards virtual treatment comparison.Xiaoran Lai, Oliver Geier, Thomas Fleischer, Øystein Garred, Elin Borgen, Simon Funke,Surendra Kumar, Marie Rognes, Therese Seierstad, AnneLise BørressenDale, VesselaKristensen, Olav Engebråten, Alvaro KöhnLuque, and Arnoldo Frigessi, Tow 
Mon Dec 02 
Student Number Theory Seminar3:35pm  Vincent Hall 1Student Number Theory Seminar Henry Twiss 
Mon Dec 02 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Applied and Computational Mathematics Seminar 
Mon Dec 02 
Colloquium3:35pm  Vincent Hall 570Analysis and geometry of free boundaries: recent developments Mariana Smit Vega Garcia, Western Washington University Abstract:In the applied sciences one is often confronted with free boundaries, which arise when the solution to a problem consists of a pair: a function u (often satisfying a partial differential equation (PDE)), and a set where this function has a specific behavior. Two central issues in the study of free boundary problems and related problems in calculus of variations and geometric measure theory are:(1) What is the optimal regularity of the solution u? In this talk, I will overview recent developments in obstacle type problems and almost minimizers of Bernoullitype functionals, illustrating techniques that can be used to tackle questions (1) and (2) in various settings. The study of the classical obstacle problem  one of the most renowned free boundary problems  began in the 60s with the pioneering works of G. Stampacchia, H. Lewy and J. L. Lions. During the past five decades, it has led to beautiful and deep developments in the calculus of variations and geometric partial differential equations. Nowadays obstacle type problems continue to offer many challenges and their study is as active as ever. 
Mon Dec 02 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Dec 02 
Topology Seminar2:30pm  Ford Hall 110Topology and Arithmetic Statistics Weiyan Chen, University of Minnesota Abstract:Topology studies the shape of spaces. Arithmetic statistics studies the behavior of random algebraic objects such as integers and polynomials. I will talk about a circle of ideas connecting these two seemingly unrelated areas. To illuminate the connection, I will focus on three concrete examples: (1) the Burau representation of the braid groups, (2) analytic number theory for effective 0cycles on a variety, and (3) cohomology of the space of multivariate irreducible polynomials. These projects are parts of a broader research program, with numerous contributions by topologists, algebraic geometers, and number theorists in the past decade, and lead to many future directions yet to be explored. 
Mon Dec 02 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Nov 29 
MCFAM Seminar5:30pm  Vincent Hall 16MCFAM Seminar 
Fri Nov 29 
Combinatorics Seminar3:30pm  Vincent Hall 570Combinatorics Seminar No Seminar 
Fri Nov 29 
Probability Seminar2:30pm  Vincent Hall 311Probability Seminar 
Fri Nov 29 
Math Biology Seminar2:30pm  VinH 209Math Biology Seminar 
Fri Nov 29 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Nov 29 
Special Events and Seminars1:25pm  Vincent Hall 213"pAdic Cohomology, Exponential Sums, and Hypergeometric Functions TBA 
Thu Nov 28 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Nov 28 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Nov 28 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar TBA 
Thu Nov 28 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Wed Nov 27 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Nov 27 
PDE Seminar3:35pm  Vincent Hall 570Quantitative Absolute Continuity of Harmonic Measure, and the Lp Dirichlet Problem Steve Hofmann, University of Missouri Abstract:For a domain ? ? Rd, quantitative, scaleinvariant absolute continuity (more precisely, the weakA? property) of harmonic measure with respect to surface measure on ??, is equivalent to the solvability of the Dirichlet problem for Laplaces equation, with data in some Lp space on ??, with p < ?. Drawing an analogy to the famous Wiener criterion, which characterizes the domains in which the classical Dirichlet problem, with continuous boundary data, can be solved, it is of interest to find criteria for Lp solvability, thus allowing for singular boundary data. We shall review known results in this direction, in which (within the past 18 months) a rather complete picture has now emerged. 
Wed Nov 27 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Automorphic Forms and Number Theory 
Tue Nov 26 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Nov 26 
Colloquium3:35pm  Vincent Hall 16Schrodinger solutions on sparse and spreadout sets Xiumin Du, University of Maryland Abstract:If we want the solution to the Schrodinger equation to converge to its initial data pointwise, what's the minimal regularity condition for the initial data should be? I will present recent progress on this classic question of Carleson. This pointwise convergence problem is closely related to other problems in PDE and geometric measure theory, including spherical average Fourier decay rates of fractal measures, Falconer's distance set conjecture, etc. All these problems essentially ask how to control Schrodinger solutions on sparse and spreadout sets, which can be partially answered by several recent results derived from induction on scales and BourgainDemeter's decoupling theorem. 
Tue Nov 26 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Nov 26 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology 
Tue Nov 26 
IMA Data Science Lab Seminar1:25pm  Lind 305Information Flow and Security Aspects in 121 Networks Martina Cardone, University of Minnesota, Twin Cities Abstract:In this talk, we will discuss 121 networks, which offer a simple yet informative model for mmWave networks. In such networks, it is assumed that two nodes can communicate only if they point beams at each other, otherwise the signal is received well below the thermal noise floor. The focus of the talk will be on single unicast 121 networks, where the communication from a source to a destination is assisted by a number of relays. In the first part of the presentation, we will characterize the maximum flow of information over such 121 networks. In particular, we will show that the Shannon capacity can be approximated by routing information along a polynomial (in the network size) number of paths between the source and the destination, and that the scheduling of the node beam orientations can be efficiently performed. In the second part of the presentation, we will analyze the security aspect of such 121 networks in the presence of an external eavesdropper who wiretaps a set of edges of her choice. In particular, we will derive secure capacity results, which highlight fundamental differences between the traditional secure network coding and security over 121 networks. Martina Cardone is currently a tenuretrack Assistant Professor within the Electrical and Computer Engineering department at the University of Minnesota. She received her B.Sc. and her M.Sc. in Telecommunications Engineering from Politecnico di Torino, Italy in 2009 and 2011, respectively. As part of a double degree program, she also received a M.Sc. degrees in Telecommunications Engineering from Télécom ParisTech, France in 2011. In 2015, she received her Ph.D. in Electronics and Communications from Télécom ParisTech (with work done at Eurecom in Sophia Antipolis, France), where she worked with Professor Raymond Knopp and Professor Daniela Tuninetti. From July 2015 to August 2017 she was a postdoctoral research fellow in the Electrical and Computer Engineering department at the University of California, Los Angeles, where she worked with Professor Christina Fragouli. From November 2017 to January 2018, she was a postdoctoral associate in the Electrical and Computer Engineering department at the University of Minnesota. She regularly serves on the Technical Program Committee of IEEE workshops and conferences. Her main research interests are in network information theory, wireless communications, network privacy and secrecy, network coding and distributed computing. She was the reci 
Tue Nov 26 
Colloquium1:25pm  Vincent Hall 570Kstability and moduli spaces of Fano varieties Yuchen Liu, Yale University Abstract:Fano varieties are positively curved algebraic varieties which form one of the three building blocks in the classification. Unlike the case of negatively curved varieties, moduli spaces of Fano varieties (even smooth ones) can fail to be Hausdorff. Kstability was originally invented as an algebrogeometric notion characterizing the existence of K\"ahlerEinstein metrics on Fano varieties. Recently, people have found strong evidence toward constructing compact Hausdorff moduli spaces of Fano varieties using Kstability. In this talk, I will discuss recent progress in this approach, including an algebraic proof of the existence of Fano Kmoduli spaces, and describing these moduli spaces explicitly. This talk is partly based on joint works with H. Blum and C. Xu. 
Tue Nov 26 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Nov 25 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Nov 25 
Student Number Theory Seminar3:35pm  Vincent Hall 1Crystalline cohomology and Katz's conjecture Shengkai Mao Abstract:Crystalline cohomology is a type of Weil cohomology theory that fills in the gap at $p$ in the family of $l$adic cohomologies. It's introduced by Alexander Grothendieck and developed by Pierre Berthelot. We will briefly discuss what is crystalline cohomology and why we need it. With the help of Frobenius action, we can define a semilinear morphism on crystalline cohomology which provides a Newton polygon. We will state the Katz's conjecture (which is proved by Mazur and Ogus) (slogan: Newton polygon lies above Hodge polygon) and show some applications (if time permits). 
Mon Nov 25 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Applied and Computational Mathematics Seminar 
Mon Nov 25 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Nov 25 
Topology Seminar2:30pm  Ford Hall 110Topology Seminar TBA 
Mon Nov 25 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Mon Nov 25 
Differential Geometry and Symplectic Topology Seminar10:10am  Vincent Hall 203ADifferential Signatures and Algebraic Curves Michael Ruddy,, Max Planck Institute Abstract:For the action of a group on the plane, the group equivalence problem for curves can be stated as: given two curves, decide if they are related by an element of the group. The signature method, using differential invariants, to answer the local group equivalence problem for smooth curves and its application to image science has been extensively studied. For planar algebraic curves under subgroups of the general linear group, we show that this provides a method to associate a unique algebraic curve to each equivalence class, the algebraic curve's signature curve. However, computing the implicit equation of the signature curve is a challenging problem. In this talk we consider signatures of algebraic curves, show how to compute the degree without computing its defining polynomial explicitly, and present some results on the structure of signature curves for generic algebraic curves of fixed degree. Additionally we show that this leads to a method to solve the group equivalence problem for algebraic curves using numerical algebraic geometry. 
Fri Nov 22 
MCFAM Seminar5:30pm  Vincent Hall 16The impact of negative interest rate policy and its effectiveness of stimulating economic growth Perry Li, University of Minnesota Abstract:According to the Bloomberg Barclays Global Aggregate Index, there were $17 trillion (or 30%) bonds traded with negative yields within that popular fixed income benchmark, at the end of August 2019. Government bonds in Germany, Japan, and Switzerland all carry negative yields  meaning investors will lose money to hold them to maturity. How did we get here? Are those policies introduced by global central banks, after the 2008 financial crisis, effective (to spur inflation)? In this talk, I seek to use some case studies like reserve banking system, asset bubbles, and currency war to explore this topic.Bio: https://www.linkedin.com/in/liyuepeng/ 
Fri Nov 22 
Combinatorics Seminar3:30pm  Vincent Hall 570A Pieri rule for key polynomials Danjoseph Quijada, USC Abstract:The Pieri rule for the product of a Schur function and a single row Schur function is notable for having an elegant bijective proof that can be intuited by the rules concise diagrammatic interpretation, to wit, by appending cells to a Young diagram. Now, key polynomials generalize Schur polynomials to a basis of the full polynomial ring, in which they also refine the Schubert basis via a nice formula. In this talk, I will describe a Pieri rule for the product of a key polynomial and a single row key polynomial that can be analogously interpreted as appending cells to a key diagram, albeit potentially dropping some cells in between each cell addition. I will also outline the main points of the rules bijective proof, and in the process hopefully illustrate the utility of understanding the rule from a diagrammatic perspective. Joint work with Sami Assaf. 
Fri Nov 22 
Special Events and Seminars3:30pm  Vincent Hall 20Mass Scale Image Analysis For Automated Plant Phenotyping and Classification via Machine Learning Riley O'Neill, University of St. Thomas Abstract:The capacity to quantify crop architecture and morphology is foundational to the development of higher yielding cultivars via hybridization and genetic engineering. However, at the mass scale required by the science, manual plant phenotyping with physical instruments is arduous, time consuming, subjective, and a leading cause of undergraduate burnout in the UMN plant genetics department. While the process has been slightly improved with manual image analysis, such is almost as time consuming and remains subject to human error. Thereby, in efforts to further expedite phenotyping processes, circumvent human error, and provide more detailed analyses, we aim to completely automate plant phenotyping processes for the UMN plant genetics department and beyond. Working from over 15,000 soybean plants, weve advanced robust image processing platforms for measuring petiole and stem length, leaf area, leaf shape via signature curves, and branch angles via energy minimization in 2D, and begun preliminary work at 3D reconstructions from 2D data for 3D branch angles and further analyses. After data extraction and verification, we plan to implement clustering algorithms and machine learning to automatically group plant phenotypes as well as conduct principal component analysis to assemble an allometry space and identify the primary genes of influence. 
Fri Nov 22 
AMAAZE3:30pm  Vincent Hall 20Mass Scale Image Analysis For Automated Plant Phenotyping and Classification via Machine Learning Riley O'Neill, University of St. Thomas Abstract:The capacity to quantify crop architecture and morphology is foundational to the development of higher yielding cultivars via hybridization and genetic engineering. However, at the mass scale required by the science, manual plant phenotyping with physical instruments is arduous, time consuming, subjective, and a leading cause of undergraduate burnout in the UMN plant genetics department. While the process has been slightly improved with manual image analysis, such is almost as time consuming and remains subject to human error. Thereby, in efforts to further expedite phenotyping processes, circumvent human error, and provide more detailed analyses, we aim to completely automate plant phenotyping processes for the UMN plant genetics department and beyond. Working from over 15,000 soybean plants, weve advanced robust image processing platforms for measuring petiole and stem length, leaf area, leaf shape via signature curves, and branch angles via energy minimization in 2D, and begun preliminary work at 3D reconstructions from 2D data for 3D branch angles and further analyses. After data extraction and verification, we plan to implement clustering algorithms and machine learning to automatically group plant phenotypes as well as conduct principal component analysis to assemble an allometry space and identify the primary genes of influence. 
Fri Nov 22 
Probability Seminar2:30pm  Vincent Hall 311Spherical spin glass models Eliran Subag, New York University Abstract:How many critical points does a smooth random function on a highdimensional space typically have at a given height? how are their distances distributed? what is the volume or geometry of the level sets? can we design efficient optimization algorithms for the random function? For the spherical spin glass models, those questions are closely related to the structure of the Gibbs measures, which have been extensively studied in physics since the 70s. I will start with an overview of the celebrated Parisi formula and ultrametricity property. I will then describe an alternative method to analyze the Gibbs measure using critical points, in the setting of the pure spherical models. Finally, I will explain how the latter can be extended to all spherical models, using another (soft) geometric approach, while at the same time making rigorous and generalizing the famous ThoulessAndersonPalmer approach from physics. 
Fri Nov 22 
Math Biology Seminar2:30pm  VinH 209Math Biology Seminar 
Fri Nov 22 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Nov 22 
Special Events and Seminars1:25pm  Vincent Hall 213"pAdic Cohomology, Exponential Sums, and Hypergeometric Functions TBA 
Fri Nov 22 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305Machine Learning Problems at Target Mauricio Flores, Target Corporation Abstract:PhD and Master's students would likely benefit the most from this talk. There will be some discussion on opportunities at Target. The introduction of this talk will provide an overview of the AI sciences organization at Target and discuss summer internship opportunities. The remainder of the talk will overview the kinds of machine learning problems Target deals with, and dive into three such problems, in the fields of recommender systems and computer vision. Mauricio Flores received his PhD in Applied Mathematics from the University of Minnesota in 2018, under the supervision of Jeff Calder & Gilad Lerman. He is currently a Lead AI Scientist at Target, where he builds machine learning as well as computer vision models for visually compatible recommendations, and more recently, for damage detection in Targets distribution centers. 
Thu Nov 21 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Nov 21 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Nov 21 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar Erika Ordog, Duke University 
Thu Nov 21 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Geometry of degenerating CalabiYau manifolds Ruobing Zhang, Stony Brook Abstract:This talk concerns a family of "collapsing" Ricciflat Kähler manifolds, namely CalabiYau manifolds, converging to a lower dimensional limit, which develop singularities arising in various contexts such as metric Riemannian geometry, complex geometry and degenerating nonlinear equations. A primary aspect is to formulate how well behaved or badly behaved such spaces can be in terms of the recently developed regularity theory. Under the above framework, our next focus is on a longstanding fundamental problem which is to understand singularities of collapsing Ricciflat metrics along an algebraically degenerating family. We will give accurate characterizations of such metrics and explain possible generalizations. 
Thu Nov 21 
Topology Seminar7:00am  SkyboxLOWER (Legs + Butt) @ Skybox  Skybox Abstract:https://www.fitmetrix.io/webportal/schedulemobile/f9719b204914e911a97...(Legs%20%2B%20Butt)&dateRangeFrom=20191121T07%3A00%3A00&dateRangeTo=20191121T07%3A55%3A00&locationid=5854&classID=31918145 
Wed Nov 20 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Nov 20 
PDE Seminar3:35pm  Vincent Hall 570Effective Poisson equation of density functional theory at positive temperature Li Chen, MIT Abstract:Density functional theory (DFT) has been a very successful effective theory of manybody quantum mechanics. In particular, the KohnSham (KS) equations of DFT serve as an accurate model for the electron densities. The KS equations are a case of the SchrodingerPoisson equations whose electronelectron effective interaction potential only depends on the density of electrons. When the number of electrons are limited, the KS equation can be solved quickly by numerical method at temperature T = 0. Since physically interesting settings are at T > 0, we study the KS equations at positive temperature and give an iterative scheme to construct solutions. One important class of electronic structures described by the KS equations is a crystalline lattice. At positive temperature, we show that a local perturbation to a crystalline structure induces an electric field governed by the Poisson equation. The latter equation emerges as an effective equation of the KS equations. This is a joint work with Israel M. Sigal. 
Wed Nov 20 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Automorphic Forms and Number Theory 
Tue Nov 19 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Nov 19 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Nov 19 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Nov 19 
Colloquium2:30pm  Vincent Hall 16Random matrix theory and supersymmetry techniques Tatyana Shcherbyna, Princeton University Abstract:Starting from the works of Erdos, Yau, Schlein with coauthors, the significant progress in understanding the universal behavior of many random graph and random matrix models were achieved. However for the random matrices with a spacial structure our understanding is still very limited. In this talk I am going to overview applications of another approach to the study of the local eigenvalues statistics in random matrix theory based on socalled supersymmetry techniques (SUSY) . SUSY approach is based on the representation of the determinant as an integral over the Grassmann (anticommuting) variables. Combining this representation with the representation of an inverse determinant as an integral over the Gaussian complex field, SUSY allows to obtain an integral representation for the main spectral characteristics of random matrices such as limiting density, correlation functions, the resolvent's elements, etc. This method is widely (and successfully) used in the physics literature and is potentially very powerful but the rigorous control of the integral representations, which can be obtained by this method, is quite difficult, and it requires powerful analytic and statistical mechanics tools. In this talk we will discuss some recent progress in application of SUSY to the analysis of local spectral characteristics of the prominent ensemble of random band matrices, i.e. random matrices whose entries become negligible if their distance from the main diagonal exceeds a certain parameter called the band width. 
Tue Nov 19 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Tue Nov 19 
IMA Data Science Lab Seminar1:25pm  Lind 305Robust Representation for Graph Data Dongmian Zou, University of Minnesota, Twin Cities Abstract:Modern data are usually highdimensional with noise and corruption. A useful representation of data has to be robust and address the data structure. In this talk, I will first present a class of robust models called the scattering transform that can be used to generated features from graph data. In graph scattering transforms, the representation is generated in an unsupervised manner based on graph wavelets. It is approximately invariant to permutations and stable to signal or graph manipulations. Numerical results show that it works effectively for classification and community detection problems. Next, I will address how the structure of data can be found using autoencoders. Indeed, in the framework of autoencoders, graph scattering transform can be applied to the important task of graph generation. It shows stateoftheart performance in link prediction and can be used to generate molecular samples. 
Tue Nov 19 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Tue Nov 19 
Topology Seminar10:30am  SkyboxCORE @ Skybox  Skybox Abstract:https://www.fitmetrix.io/webportal/schedulemobile/f9719b204914e911a97... 
Mon Nov 18 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Nov 18 
Student Number Theory Seminar3:35pm  Vincent Hall 1The CasselmanShalika Formula for GL_2 Emily Tibor Abstract:This talk will focus on the CasselmanShalika formula for GL_2 over a nonArchimedean local field, which is an explicit formula for the values of the spherical Whittaker function. A good amount of time will be dedicated to explaining the necessary background including Whittaker models and spherical vectors, which come together to form the spherical Whittaker function. We will then be ready to discuss the formula, Casselman's method of calculating it, and its significance. 
Mon Nov 18 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Scalable Algorithms for Datadriven Inverse and Learning Problems Tan BuiThanh, UTAustin Abstract:Inverse problems and uncertainty quantification (UQ) are pervasive in scientific To address the first challenge, we have developed parallel highorder (hybridized) discontinuous Galerkin methods to discretize complex forward PDEs. To address the second challenge, we have developed various approaches from model reduction to advanced Markov chain Monte Carlo methods to effectively explore high dimensional parameter spaces to compute posterior statistics. To address the last challenge, we have developed a randomized misfit approach that uncovers the interplay between the JohnsonLindenstrauss and the Morozov's discrepancy principle to significantly reduce the dimension of the data without compromising the quality of the inverse solutions. In this talk we selectively present scalable and rigorous approaches to tackle these challenges for PDEgoverned Bayesian inverse problems. Various numerical results for simple to complex PDEs will be presented to verify our algorithms and theoretical findings. If time permits, we will present our recent work on scientific machine learning for inverse and learning problems. 
Mon Nov 18 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Nov 18 
Topology Seminar2:30pm  Ford Hall 110Topology Seminar TBA 
Mon Nov 18 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Nov 15 
MCFAM Seminar5:30pm  Vincent Hall 16Data Science in the Life Insurance Industry Gary Hatfield, Securian/University of Minnesota Abstract:Data Scientist has emerged as one of the hottest and most talked about jobs in the world today. In my talk, I will provide an overview of how data science has emerged in the insurance industry. I will give some examples of how data science is being applied in life insurance and describe how the Actuarial profession is adapting. Bio: https://mcfam.dl.umn.edu/people/garyhatfield 
Fri Nov 15 
Combinatorics Seminar3:30pm  Vincent Hall 570Simplicial generation of Chow rings of matroids Chris Eur, UC Berkeley Abstract:Matroids are combinatorial objects that capture the essence of linear independence. We first give a gentle introduction to the recent breakthrough in matroid theory, the Hodge theory of matroids, developed by Adiprasito, Huh, and Katz. By combining two prominent recent approaches to matroids, tropical geometric and Lie/Coxeter theoretic, we give a new presentation for the Chow ring of a matroid that further tightens the interaction between combinatorics and geometry of matroids. We discuss various applications, including a simplified proof of the main portion of the Hodge theory of matroids. This is joint work with Spencer Backman and Connor Simpson. 
Fri Nov 15 
Probability Seminar2:30pm  Vincent Hall 311Joint seminar in math biology and probability: Mathematical Modelling in Immunotherapy of Melanoma Anna Kraut, Bonn Abstract:Mathematical models can support biomedical research through identification of key mechanisms, validation of experiments, and simulation of new therapeutic approaches. We investigate the evolution of melanomas under adoptive cell transfer therapy with cytotoxic Tcells. It was shown in experiments that phenotypic plasticity, more precisely an inflammationinduced, reversible dedifferentiation, is an important escape mechanism for the tumor. Recently, the effects of possible mutation to a permanently resistant genotype were studied by introducing knockout melanoma cells into the wildtype tumor. We use a stochastic individualbased Markov process to describe the evolution of the tumor under various therapeutic approaches. It is an extension of the model introduced in the paper of Baar et al in 2016 and further includes the effects of Tcell exhaustion and some limited spatial component which results in additional nonlinearities. The model is implemented as a hybrid algorithm that combines Gillespietype stochastic calculations and a deterministic approximation to speed up simulations while keeping the effects of random events. Numerical simulations confirm the resistance to therapy via phenotypic switching as well as genotypic mutation. Tcell exhaustion is identified as an important mechanism that is crucial in fitting the model to the experimental data. We gain further insights into how originally unfit knockout cells can accumulate under therapy, shield the wild type cells from the Tcells, and thus cause an earlier relapse. Going beyond the experiment, the possibility of naturally occurring rare mutations, in contrast to artificially introduced knockout cells, is explored in simulations and produces the same effects. Thus, the clinical relevance of the experimental findings can be confirmed. 
Fri Nov 15 
Math Biology Seminar2:30pm  Vincent Hall 311Joint seminar in math biology and probability: Mathematical Modelling in Immunotherapy of Melanoma Anna Kraut, Bonn Abstract:Mathematical models can support biomedical research through identification of key mechanisms, validation of experiments, and simulation of new therapeutic approaches. We investigate the evolution of melanomas under adoptive cell transfer therapy with cytotoxic Tcells. It was shown in experiments that phenotypic plasticity, more precisely an inflammationinduced, reversible dedifferentiation, is an important escape mechanism for the tumor. Recently, the effects of possible mutation to a permanently resistant genotype were studied by introducing knockout melanoma cells into the wildtype tumor. We use a stochastic individualbased Markov process to describe the evolution of the tumor under various therapeutic approaches. It is an extension of the model introduced in the paper of Baar et al in 2016 and further includes the effects of Tcell exhaustion and some limited spatial component which results in additional nonlinearities. The model is implemented as a hybrid algorithm that combines Gillespietype stochastic calculations and a deterministic approximation to speed up simulations while keeping the effects of random events. Numerical simulations confirm the resistance to therapy via phenotypic switching as well as genotypic mutation. Tcell exhaustion is identified as an important mechanism that is crucial in fitting the model to the experimental data. We gain further insights into how originally unfit knockout cells can accumulate under therapy, shield the wild type cells from the Tcells, and thus cause an earlier relapse. Going beyond the experiment, the possibility of naturally occurring rare mutations, in contrast to artificially introduced knockout cells, is explored in simulations and produces the same effects. Thus, the clinical relevance of the experimental findings can be confirmed. 
Fri Nov 15 
Dynamical Systems2:30pm  Vincent Hall 20The mathematics of taffy pulling JeanLuc Thiffeault, University of Wisconsin Abstract:Taffy is a type of candy made by repeated 'pulling' (stretching andfolding) a mass of heated sugar. The purpose of pulling is to get air 
Fri Nov 15 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Nov 15 
Special Events and Seminars1:25pm  Vincent Hall 213"pAdic Cohomology, Exponential Sums, and Hypergeometric Functions TBA 
Fri Nov 15 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305Pipelines, Graphs, and the Language of Shopping: Architecting Next Gen Machine Learning Capabilities for Retail Jonah White, Best Buy Abstract:This talk will highlight the evolution of building out a data science capability in a retail environment as well as explore cuttingedge developments in constructing machine learning pipelines in the cloud, emerging advancements in timeseries forecasting, applications of GPU accelerated graph processing for entity resolution, and how were adapting the latest research in language models to translate the language of shopping for the ultimate personalized experience 
Thu Nov 14 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Nov 14 
Colloquium3:35pm  Vincent Hall 16$p$adic estimates for exponential sums on curves Joe KramerMiller, UC Irvine Abstract:A central problem in number theory is that of finding rational or integer solutions to systems of polynomials in several variables. This leads one naturally to the slightly easier problems of finding solutions modulo a prime $p$. Using a discrete analogue of the Fourier transformation, this modulo $p$ problem can be reformulated in terms of exponential sums. We will discuss $p$adic properties of such exponential sums in the case of higher genus curves as well as connections to complex differential equations. 
Thu Nov 14 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar Gennady Lyubeznik, University of Minnesota 
Thu Nov 14 
Colloquium2:30pm  Vincent Hall 16Applications of Frobenius beyond prime characteristic. Daniel Hernández, Univ. of Kansas Abstract:Abstract: Recall that the Frobenius morphism is simply the map sending an element in a ring of prime characteristic $p>0$  say, a polynomial with coefficients in a finite field  to its $p$th power. Though simple to define, Frobenius has proven to be a useful and effective tool in algebraic geometry, representation theory, number theory, and commutative algebra. Furthermore, and remarkably, some of the most interesting applications of Frobenius are to the study of objects defined over the complex numbers, and more generally, over a field of characteristic zero! In this talk, we will discuss some of these applications, with an eye towards classical singularity theory and birational algebraic geometry, both over the complex numbers. 
Thu Nov 14 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Wed Nov 13 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Nov 13 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Counting points and varieties and Malle's conjecture Andy Odesky, University of Michigan 
Wed Nov 13 
PDE Seminar3:30pm  Vincent Hall 570Serrin Lecture  Localization for the AndersonBernoulli model on the integer lattice Charles Smart, University of Chicago Abstract:I will give a brief mathematical introduction to Anderson localization followed by a discussion of my recent work with Jian ding. In our work we establish localization near the edge for the Anderson Bernoulli model on the two dimensional lattice. Our proof follows the program of BourgainKenig and uses a new unique continuation result inspired by BuhovskyLogunovMalinnikovaSodin. I will also discuss recent work of by Li and Zhang on the three dimensional case. 
Tue Nov 12 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Nov 12 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Nov 12 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Nov 12 
Colloquium2:30pm  Vincent Hall 16Unraveling Local Cohomology Emily Witt, Univ. of Kansas Abstract:Local cohomology modules are fundamental tools in commutative algebra, due to the algebraic and geometric information they carry. For instance, they can help determine the number of equations necessary to define an affine variety. Unfortunately, however, the application of local cohomology is limited by the fact that these modules are typically very large (e.g., not finitely generated), and can be difficult to determine explicitly. In this talk, we discuss new techniques developed to understand the structure of local cohomology (e.g., coming from invariant theory). We also describe recentlydiscovered "connectedness properties" of spectra that local cohomology encodes. 
Tue Nov 12 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Tue Nov 12 
IMA Data Science Lab Seminar1:25pm  Lind 305Latent Factor Models for Largescale Data Xiaoou Li, University of Minnesota, Twin Cities Abstract:Latent factor models are widely used to measure unobserved latent traits in social and behavioral sciences, including psychology, education, and marketing. Motivated by the applications of latent factor models to largescale measurements which consist of many manifest variables (e.g. test items) and a large sample size, we study the properties of latent factor models under an asymptotic setting where both the number of manifest variables and the sample size grows to infinity. In this talk, I will introduce generalized latent factor models under exploratory and confirmatory settings. For the exploratory setting, we propose a constrained joint maximum likelihood approach for model estimation and investigate its theoretical properties. For the confirmatory setting, we study how the design information affects the identifiability and estimability of the model, and propose a rateoptimal estimator when the model is identifiable. The estimators can be efficiently computed through parallel computing. Our results provide insights on the design of largescale measurement and have important implications on measurement validity. 
Tue Nov 12 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Nov 11 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Nov 11 
Student Number Theory Seminar3:35pm  Vincent Hall 1Introduction to RankinSelberg Method Shengmei An Abstract:RankinSelberg method has been one of the most powerful techniques for studying the Langlands program. In this talk, we will start with the original simplest example of the RankinSelberg method, and then come to a more general case of the RankinSelberg method on GL_m*GL_n where we can reduce the global integral to the more accessible lovely local integrals so that we can establish some of the important analytic properties of the Lfunctions. 
Mon Nov 11 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Applied and Computational Mathematics Seminar 
Mon Nov 11 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Nov 11 
Topology Seminar2:30pm  Ford Hall 110Cochain models for the unit group of a differential graded algebra Tyler Lawson, University of Minnesota Abstract:Abstract not available. 
Mon Nov 11 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Nov 08 
MCFAM Seminar5:30pm  Vincent Hall 16MCFAM Seminar 
Fri Nov 08 
Combinatorics Seminar3:30pm  Vincent Hall 570Combinatorics via Deligne Categories Chris Ryba, MIT Abstract:The Deligne category Rep(S_t) can be thought of as "interpolating" the representation categories of symmetric groups. After describing this category, I will explain how a calculation in the Deligne category can be used to prove stability properties of permutation patterns within conjugacy classes (joint with Christian Gaetz). 
Fri Nov 08 
Probability Seminar2:30pm  Vincent Hall 311"Robust Synchronization via Cycle Consistency Inference Yunpeng Shi, UMN Abstract:We propose a strategy for improving the existing methods for solving synchronization problems that arise from various computer vision tasks. Specifically, our strategy identifies severely corrupted relative measurements based on cycle consistency information. To the best of our knowledge, this paper provides the first exact recovery guarantees using cycle consistency information. This result holds for a noiseless but corrupted setting as long as the ratio of corrupted cycles per edge is sufficiently small. It further guarantees linear convergence to the desired solution. We also establish stability of the proposed algorithm to subGaussian noise. 
Fri Nov 08 
Math Biology Seminar2:30pm  Vincent Hall 311Joint seminar in math biology and probability: Mathematical Modelling in Immunotherapy of Melanoma Anna Kraut, Bonn Abstract:Mathematical models can support biomedical research through identification of key mechanisms, validation of experiments, and simulation of new therapeutic approaches. We investigate the evolution of melanomas under adoptive cell transfer therapy with cytotoxic Tcells. It was shown in experiments that phenotypic plasticity, more precisely an inflammationinduced, reversible dedifferentiation, is an important escape mechanism for the tumor. Recently, the effects of possible mutation to a permanently resistant genotype were studied by introducing knockout melanoma cells into the wildtype tumor. We use a stochastic individualbased Markov process to describe the evolution of the tumor under various therapeutic approaches. It is an extension of the model introduced in the paper of Baar et al in 2016 and further includes the effects of Tcell exhaustion and some limited spatial component which results in additional nonlinearities. The model is implemented as a hybrid algorithm that combines Gillespietype stochastic calculations and a deterministic approximation to speed up simulations while keeping the effects of random events. Numerical simulations confirm the resistance to therapy via phenotypic switching as well as genotypic mutation. Tcell exhaustion is identified as an important mechanism that is crucial in fitting the model to the experimental data. We gain further insights into how originally unfit knockout cells can accumulate under therapy, shield the wild type cells from the Tcells, and thus cause an earlier relapse. Going beyond the experiment, the possibility of naturally occurring rare mutations, in contrast to artificially introduced knockout cells, is explored in simulations and produces the same effects. Thus, the clinical relevance of the experimental findings can be confirmed. 
Fri Nov 08 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Nov 08 
Special Events and Seminars1:25pm  Vincent Hall 213"pAdic Cohomology, Exponential Sums, and Hypergeometric Functions Steven Sperber 
Thu Nov 07 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Nov 07 
Colloquium3:35pm  Vincent Hall 16Eisenstein Series on Loop Groups and their Metaplectic Covers Manish Patnaik, University of Alberta Abstract:Both the LanglandsShahidi method of studying automorphic Lfunctions and approach via the theory of Weyl group multiple Dirichlet series to studying moments of Lfunctions now require new classes of groups with which to work. In this talk, I will explain our progress on extending these techniques to certain infinitedimensional KacMoody groups, namely loop groups (and their metaplectic covers). Of note in our work is the presence of two quite different types of Eisenstein series that exist on the same group and which need to be considered in conjunction with one other. This is a report on joint work in progress with H. Garland, S.D. Miller, and A. Puskas. 
Thu Nov 07 
Commutative Algebra Seminar2:30pm  Vincent Hall 209The spectral sequence of a filtered complex Gennady Lyubeznik, University of Minnesota Abstract:This is the third of a series of three talks on the spectral sequence of a filtered complex. This material is by now classical and is an important part of homological algebra. The main difficulty in dealing with spectral sequences is that there are a lot of indexes involved and this is a considerable obstacle to understanding what is going on. The goal of these talks is to present this material, including most proofs, in an accessible manner. 
Thu Nov 07 
Colloquium2:30pm  Vincent Hall 16On various questions (and answers) in Highdimensional probability Galyna Livshyts, Georgia Tech Abstract:In this talk, several topics from Highdimensional probability shall be discussed. This fascinating area is rich in beautiful problems, and several easytostate questions will be outlined. Further, some connections between them will be explained throughout the talk. I shall discuss several directions of my research. One direction is invertibility properties of inhomogeneous random matrices: I will present sharp estimates on the small ball behavior of the smallest singular value of a very general ensemble of random matrices, and will briefly explain the new tools I developed in order to obtain these estimates. Another direction is isoperimetrictype inequalities in highdimensional probability. Such inequalities are intimately tied with concentration properties of probability measures. Among other results, I will present a refinement of the concavity properties of the standard gaussian measure in an ndimensional euclidean space, under certain structural assumptions, such as symmetry. This result constitutes the best known to date estimate in the direction of the conjecture of Gardner and Zvavitch from 2007. The above topics will occupy most of the time of the presentation. In addition, I shall briefly mention other directions of my research, including noisesensitivity estimates for convex sets, or, in other words, upper bounds on perimeters of convex sets with respect to various classes of probability distributions. If time permits, I will discuss my other results, such as small ball estimates for random vectors with independent coordinates, and partial progress towards LeviHadwiger illumination conjecture for convex sets in high dimensions. 
Thu Nov 07 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Wed Nov 06 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Nov 06 
PDE Seminar3:35pm  Vincent Hall 570PDE Seminar 
Wed Nov 06 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213The automorphic heat kernel from a geometric perspective Amy DeCelles, St. Thomas 
Tue Nov 05 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Nov 05 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Nov 05 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Nov 05 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Tue Nov 05 
IMA Data Science Lab Seminar1:25pm  Lind 305Topics in Sparse Recovery via Constrained Optimization: Least Sparsity, Solution Uniqueness, and Constrained Exact Recovery Seyedahmad Mousavi, University of Minnesota, Twin Cities Abstract:Sparse recovery finds numerous applications in different areas, for example, engineering, computer science, business, applied mathematics, and statistics. Sparse recovery is often formulated as relatively largescale and challenging constrained (convex or nonconvex) optimization problems. Constraints are ubiquitous and important in many applications of sparse recovery, but they make analysis and computation nontrivial and require novel techniques to handle them. The goal of this talk is to present numerical and analytical techniques for constrained sparse recovery using convex analysis and optimization tools. Three topics are investigated in the realm of constrained sparse recovery. First, we analyze quantitative adverse properties of different $p$normbased optimization problems with $p>1$, such as generalized basis pursuit, basis pursuit denoising, ridge regression, and elastic net. We show that their optimal solutions are least sparse for almost all measurement matrices and measurement vectors. Second, we study the solution uniqueness of an individual feasible vector of a class of convex optimization problems involving convex piecewise affine functions and subject to general polyhedral constraints. We apply these solution uniqueness results to a broad class of $\ell_1$minimization problems in constrained sparse optimization, such as basis pursuit, LASSO, and polyhedral gauge recovery. Third, we propose a constrained matching pursuit algorithm for constrained sparse recovery and develop uniform conditions for exact support and vector recovery on constraint sets. The exact recovery via this algorithm not only depends on a measurement matrix but also critically relies on a constraint set. Hence, we identify an important class of constraint sets, called coordinate projection admissible. We then use the conic hull structure of these sets together with constrained optimization techniques to establish sufficient conditions for uniform exact recovery via this algorithm on coordinate projection admissible sets. These conditions are expressed in terms of the restricted isometrylike and the restricted orthogonalitylike constants 
Tue Nov 05 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Nov 04 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Nov 04 
Student Number Theory Seminar3:35pm  Vincent Hall 1RankinSelberg Method May Shengmei 
Mon Nov 04 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Applied differential geometry and harmonic analysis in deep learning regularization Wei Zhu, Duke University Abstract:Deep neural networks (DNNs) have revolutionized machine learning by gradually replacing the traditional modelbased algorithms with datadriven methods. While DNNs have proved very successful when large training sets are available, they typically have two shortcomings: First, when the training data are scarce, DNNs tend to suffer from overfitting. Second, the generalization ability of overparameterized DNNs still remains a mystery. In this talk, I will discuss two recent works to inject the modeling flavor back into deep learning to improve the generalization performance and interpretability of the DNN model. This is accomplished by DNN regularization through applied differential geometry and harmonic analysis. In the first part of the talk, I will explain how to improve the regularity of the DNN representation by enforcing a lowdimensionality constraint on the datafeature concatenation manifold. In the second part, I will discuss how to impose scaleequivariance in network representation by conducting joint convolutions across the space and the scaling group. The stability of the equivariant representation to nuisance input deformation is also proved under mild assumptions on the FourierBessel norm of filter expansion coefficients. 
Mon Nov 04 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Nov 04 
Topology Seminar2:30pm  Ford Hall 110Topology Seminar TBA 
Mon Nov 04 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Nov 01 
MCFAM Seminar5:30pm  Vincent Hall 16Extrapolative Expectations, Financial Frictions, and Asset Prices Yao Deng, University of Minnesota Abstract:I study how extrapolative expectations affect corporate real and financial activities and asset prices. Empirically, high misperception on earnings growth, a measure constructed to proxy for extrapolation, is associated with an increase in investment, debt issuance, equity issuance, and firmlevel bond and stock prices in the shortterm, but predicts a decline in all these activities and prices in the longterm. These patterns are more pronounced among small and financially constrained firms. Theoretically, I build a dynamic model with extrapolative expectations and financial frictions, and show that the interaction of these two frictions is crucial to explain the empirical findings. Intuitively, after a sequence of favorable shocks, agents extrapolate and become overoptimistic about future productivities. Firms invest and borrow more in the shortterm. Lower perceived default probability improves financing conditions, further increasing investment and borrowing. Future realizations turn out worse than expected, making real and financial activities and asset prices subject to predictable reversals in the longterm.Bio: https://carlsonschool.umn.edu/faculty/yaodeng 
Fri Nov 01 
Combinatorics Seminar3:30pm  Vincent Hall 570Combinatorics Seminar Dongkwan Kim, UMN Abstract:For a Coxeter group W, a Wgraph is a graph which produces a nice basis of the corresponding representation of W and also describes the action of W on the basis elements. Even when W is finite and its irreducible characters are known, Wgraphs are still useful for understanding representations of W. In this talk, I will talk about Wgraphs when W is an (extended) affine symmetric group, especially when these graphs are associated with tworow partitions. Also I will discuss the connection between them and Lusztigs periodic Wgraph. This work is joint with Pavlo Pylyavskyy. 
Fri Nov 01 
Probability Seminar2:30pm  Vincent Hall 311Probability Seminar 
Fri Nov 01 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Nov 01 
Special Events and Seminars1:25pm  Vincent Hall 213pAdic Banach Spaces and Completely Continuous Endomorphisms Steven Sperber 
Thu Oct 31 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Oct 31 
Colloquium3:35pm  Vincent Hall 16Differential operators on invariant rings Anurag Singh, University of Utah Abstract:Work of Levasseur and Stafford describes the rings of differential operators on various classical invariant rings of characteristic zero; in each of these cases, the differential operators form a simple ring. Towards an attack on the simplicity of rings of differential operators on invariant rings of reductive groups over the complex numbers, Smith and Van den Bergh asked if reduction modulo p works for differential operators in this context. In joint work with Jack Jeffries, we establish that this is not the case for various classical groups. 
Thu Oct 31 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Spectral sequences Gennady Lyubeznik, University of Minnesota Abstract:This is the first of a series of three talks on the spectral sequence of a filtered complex. 
Thu Oct 31 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Wed Oct 30 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Oct 30 
PDE Seminar3:35pm  Vincent Hall 570PDE Seminar 
Wed Oct 30 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Automorphic Forms and Number Theory 
Tue Oct 29 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Oct 29 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Oct 29 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Oct 29 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Tue Oct 29 
IMA Data Science Lab Seminar1:25pm  Lind 305Highly Likely Clusterable Data With No Cluster Mimi Boutin, Purdue University Abstract:Data generated as part of a reallife experiment is often quite organized. So much so that, in many cases, projecting the data onto a random line has a high probability of uncovering a clear division of the data into two wellseparated groups. In other words, the data can be clustered with a high probability of success using a hyperplane whose normal vector direction is picked at random. We call such data ``highly likely clusterable. The clusters obtained in this fashion often do not seem compatible with a cluster structure in the original space. In fact, the data in the original space may not contain any cluster at all. This talk is about this surprising phenomenon. We will discuss empirical ways to detect it as well as how to exploit it to cluster datasets, especially datasets consisting of a small number of points in a highdimensional space. We will also present a possible mathematical model that would explain this observed phenomenon. This is joint work with Alden Bradford (Purdue Math), Sangchun Han (Purdue ECE, now at Google) and Tarun Yellamraju (Purdue ECE, now at Qualcomm). Mireille (Mimi) Boutin graduated with a bachelors degree in PhysicsMathematics from the University of Montreal. She received the Ph.D. degree in Mathematics from the University of Minnesota under the direction of Peter J. Olver. She joined Purdue University after a postdoctorate with David Mumford, David Cooper, and Ben Kimia at Brown University, Rhode Island, followed by a postdoctorate with Stefan Muller at the Max Plank Institute for Mathematics in the Sciences in Leipzig, Germany. She is currently an Associate Professor in the School of Electrical and Computer Engineering, with a courtesy appointment in the Department of Mathematics. Her research is in the area of signal processing, machine learning, and applied mathematics. She is a threetime recipient of Purdues Seed for Success Award. She is also a recipient of the Eta Kappa Nu Outstanding Faculty Award, the Eta Kappa Nu Outstanding Teaching Award and the Wilfred Duke Hesselberth Award for Teaching Excellence. 
Tue Oct 29 
Climate Seminar11:15am  Vincent Hall 570Convergence and Equilibrium for Stochastic Models of Ecological Disturbances James Broda, Bowdoin College 
Mon Oct 28 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Oct 28 
Student Number Theory Seminar3:35pm  Vincent Hall 1"Part 2: Representation Stability, Étale Cohomology and Combinatorics of Configuration Spaces over Finite Fields" David DeMark Abstract:After introducing the theory of FImodules in 2012, the collaborative unit consisting of Thomas Church, Jordan Ellenberg and Benson Farb applied their framework to asymptotically stable counting problems in a certain classes of FIvarieties over finite fields in their 2013 paper Representation stability in cohomology and asymptotics for families of varieties over finite fields. The paper serves as a proofofconcept, unifying a number of previouslyknown combinatorial results. The key to their method is the GrothendieckLefschetz fixedpoint theorem with twisted statistics, which relates the rational cohomology of an algebraic variety over the complex numbers with the trace of the Frobenius map applied to the étale cohomology with coefficients in an $\ell$adic sheaf of that variety over a finite field. In this talk, we shall introduce the GrothendieckLefschetz formula and its associated machinery as well as FImodules and representation stability, then use these ideas to give an exposition of some results of Church, Ellenberg and Farb as they relate to configuration spaces and the braid group. 
Mon Oct 28 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Applied and Computational Mathematics Seminar 
Mon Oct 28 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Oct 28 
Topology Seminar2:30pm  Ford Hall 110Compactifying the étale topos Elden Elmanto, Harvard University Abstract:The speaker has long feared the technicalities and intricacies of equivariant stable homotopy theory. Fortunately, beginning with the work of Glasman, major simplification on the foundations of the subject has been made (cf. the work of AyalaMazelGeeRozenblyum, NikolausScholze and the Barwick school). We offer another perspective (that the speaker has a chance of understanding) on equivariant stable homotopy theory, at least for the group C_2, via algebraic geometry. We view it as a way to remedy an infamous annoyance: the 2étale cohomological dimension of the field of real numbers is infinite. We do this by identifying the genuine C_2spectra with a category of motives based on Real algebraic geometry ala Scheiderer. This is joint work with Jay Shah. 
Mon Oct 28 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Oct 25 
MCFAM Seminar5:30pm  Vincent Hall 16Mortgage Prepayment Behavior Messan Edorh and Bo Li, US Bank Abstract:According to the US Census Bureau, homeownership rates peaked during the first quarter of 2005 at 69.1% but fell to just 63.8% in the fourth quarter of 2015, a year when residential mortgage debt outstanding was still above ten trilliondollar mark and mortgage origination was about $1.7T. Mortgage Back Security (MBS) originations have continued to experience a steady growth attracting investors, servicers, insurers, lenders, and GSEs (Government Sponsored Enterprises). In contrary, MBS market presented various financial risks including prepayment from the homeowners  be that voluntary or involuntary. To manage the risks presented by the borrowers, modeling prepayment behavior is critical in the work banks do. Four fundamental components of mortgage prepayment activity will be examined in this presentation. 
Fri Oct 25 
Combinatorics Seminar3:30pm  Vincent Hall 570Combinatorial Methods for Integrable Systems Nick Ovenhouse. Abstract:An integrable Hamiltonian system is a dynamical system with "enough conserved quantities" to guarantee that it can, in principle, be solved, or "integrated". I will give some basic definitions of Poisson algebras and what it means to be integrable in this context. I will then show, by way of an example (namely the "pentagram map"), how some combinatorial techniques using weighted directed graphs can be used to model the system and demonstrate its integrability. This method also hints at connections with cluster algebras and Postnikov's constructions related to stratifications of the positive Grassmannian. Time permitting, I will also discuss recent work generalizing this example. 
Fri Oct 25 
Probability Seminar2:30pm  Vincent Hall 311Probability Seminar Kevin Leder, UMN 
Fri Oct 25 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Oct 25 
Special Events and Seminars1:25pm  Vincent Hall 213"pAdic Cohomology, Exponential Sums, and Hypergeometric Functions TBA 
Fri Oct 25 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305Gamma Guidance  The Mathematics Applied to a Launch Vehicle Gary Green, The Aerospace Corporation Abstract:The Boeing Inertial Upper Stage (IUS) launch vehicle was used to launch spacecraft from 1982 until 2004. The Gamma Guidance algorithm was used on board the IUS to select the ignition times, durations, and directions of engine firings. I will discuss the mathematics employed in Gamma Guidance as well as collateral onboard ;processes in order to illuminate how mathematics is applied in the launch setting. Dr. Gary Green holds mathematics degrees from the Universities of Idaho, Michigan State, and Pennsylvania State. He taught mathematics at California State College Stanislaus before joining the Aerospace Corporation (www.aerospace.org), where he served as an applied mathematician and systems engineer in several capacities: employing numerical analysis to model launch vehicles, overseeing algorithm and software development for space systems, evaluating space system performance, and analyzing threats against space systems. 
Thu Oct 24 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Oct 24 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Oct 24 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Spectral Sequences Gennady Lyubeznik, University of Minnesota Abstract:This is the first of a series of three talks on the spectral sequence of a filtered complex. 
Thu Oct 24 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Wed Oct 23 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Oct 23 
PDE Seminar3:35pm  Vincent Hall 570PDE Seminar 
Wed Oct 23 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Automorphic Forms and Number Theory 
Tue Oct 22 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Oct 22 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Oct 22 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Oct 22 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Tue Oct 22 
IMA Data Science Lab Seminar1:25pm  Lind 305Convergence Rates and Semiconvexity Estimates for the Continuum Limit of Nondominated Sorting Brendan Cook, University of Minnesota, Twin Cities Abstract:Multiobjective optimization problems are ubiquitous in science and engineering contexts, and nondominated sorting is a sorting process fundamental to multiobjective optimization. Recently proposed approaches to nondominated sorting exploit an underlying PDE that arises in the continuum limit. The need for theoretical guarantees for nondominated sorting algorithms motivates the problem of finding rates of convergence for the continuum limit. In this talk I will introduce PDE techniques from the theory of viscosity solutions and show how they can be used to solve this problem. Furthermore, I will show how semiconvexity estimates can be used to bolster convergence rates, and discuss approaches to obtaining semiconvexity estimates. This talk is intended to be entirely selfcontained, so no prior knowledge of PDE will be assumed. 
Tue Oct 22 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Oct 21 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Oct 21 
Student Number Theory Seminar3:35pm  Vincent Hall 1"Representation Stability, Étale Cohomology and Combinatorics of Configuration Spaces over Finite Fields" David DeMark Abstract:After introducing the theory of FImodules in 2012, the collaborative unit consisting of Thomas Church, Jordan Ellenberg and Benson Farb applied their framework to asymptotically stable counting problems in a certain classes of FIvarieties over finite fields in their 2013 paper Representation stability in cohomology and asymptotics for families of varieties over finite fields. The paper serves as a proofofconcept, unifying a number of previouslyknown combinatorial results. The key to their method is the GrothendieckLefschetz fixedpoint theorem with twisted statistics, which relates the rational cohomology of an algebraic variety over the complex numbers with the trace of the Frobenius map applied to the étale cohomology with coefficients in an $\ell$adic sheaf of that variety over a finite field. In this talk, we shall introduce the GrothendieckLefschetz formula and its associated machinery as well as FImodules and representation stability, then use these ideas to give an exposition of some results of Church, Ellenberg and Farb as they relate to configuration spaces and the braid group. 
Mon Oct 21 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Applied and Computational Mathematics Seminar 
Mon Oct 21 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Oct 21 
Topology Seminar2:30pm  Ford Hall 110Descent properties of topological Hochschild homology Liam Keenan, University of Minnesota Abstract:Algebraic Ktheory is an extremely rich but notoriously difficult invariant to compute. In order to make calculations tractible, topological Hochschild homology and topological cyclic homology were introduced, along with the Dennis and cyclotomic trace maps. A natural question to consider is whether or not these invariants are sheaves for various topologies arising in algebraic geometry. In fact, it turns out that topological Hochschild homology is a sheaf for the fpqc topology on connective commutative ring spectra. In this talk, I plan to introduce the language necessary and sketch the argument of this result. 
Mon Oct 21 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Oct 18 
MCFAM Seminar5:30pm  Vincent Hall 16MCFAM Seminar 
Fri Oct 18 
Combinatorics Seminar3:30pm  Vincent Hall 570Combinatorics Seminar 
Fri Oct 18 
Probability Seminar2:30pm  Vincent Hall 311Rare events in the spectrum of random matrices Kevin Leder, UMN Abstract:In this talk I will consider extreme behavior of the extremal eigenvalues of white Wishart matrices, which play an important role in multivariate analysis. I will focus on the case when the dimension of the feature p is much larger than or comparable to the number of observations n, a common situation in modern data analysis. I will discuss asymptotic approximations for the tail probabilities of the extremal eigenvalues. In addition, I will discuss the construction of an efficient Monte Carlo importance sampling algorithm to estimate the tail probabilities. Simulation results show that our method has the best performance among known approximation approaches, and furthermore provides an efficient and accurate way for evaluating the tail probabilities in practice. Based on joint work with Tiefieng Jiang and Gongjun Xu. 
Fri Oct 18 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Oct 18 
Special Events and Seminars1:25pm  Vincent Hall 213Trace Formula, continued Steven Sperber, University of Minnesota 
Thu Oct 17 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Oct 17 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Oct 17 
Colloquium3:35pm  Vincent Hall 16Hopf monoids relative to a hyperplane arrangement Marcelo Aguiar, Cornell University Abstract:The talk is based on recent and ongoing work with Swapneel 
Thu Oct 17 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar Rebecca R.G., George Mason University 
Thu Oct 17 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Wed Oct 16 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Oct 16 
PDE Seminar3:35pm  Vincent Hall 570Optimal local wellposedness for the derivative nonlinear Schrodinger's equation Yu Deng, University of Southern California Abstract:In joint work with Andrea Nahmod and Haitian Yue, we prove local wellposedness for the derivative nonlinear Schrodinger's equation in FourierLebesgue space which has the same scaling as H^s for any s>0. This closes the gap left open by the work of GrunrockHerr where s>1/4. Here there is no trilinear estimate in any standard function space, instead we will construct the solution in a nonlinear submanifold (of a function space) by exploiting its structure. This is somehow inspired by the theory of paracontrolled distributions that Gubinelli et al. developed for stochastic PDEs, but our arguments are purely deterministic. 
Wed Oct 16 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Automorphic Forms and Number Theory 
Tue Oct 15 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Oct 15 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Oct 15 
Dynamical Systems2:30pm  Vincent Hall 209Forecasting U.S. elections with compartmental models of infection Alexandria Volkening, Northwestern University Abstract:U.S. election forecasting involves polling likely voters, making assumptions about voter turnout, and accounting for various features such as state demographics and voting history. While political elections in the United States are decided at the state level, errors in forecasting are correlated between states. With the goal of shedding light on the forecasting process and exploring how states influence each other, we develop a framework for forecasting elections in the U.S. from the perspective of dynamical systems. Through a simple approach that borrows ideas from epidemiology, we show how to combine a compartmental model with public polling data from HuffPost and RealClearPolitics to forecast gubernatorial, senatorial, and presidential elections at the state level. Our results for the 2012 and 2016 U.S. races are largely in agreement with those of popular pollsters, and we use our new model to explore how subjective choices about uncertainty impact results. We conclude by comparing our forecasts for the senatorial and gubernatorial races in the U.S. midterm elections of 6 November 2018 with those of popular pollsters. This is joint work with Daniel Linder (Augusta Univ.), Mason Porter (UCLA), and Grzegorz Rempala (Ohio State Univ.) 
Tue Oct 15 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Tue Oct 15 
IMA Data Science Lab Seminar12:30pm  Lind 305Simple Approaches to Complicated Data Analysis Deanna Needell, University of California, Los Angeles Abstract:Recent advances in technology have led to a monumental increase in largescale data across many platforms. One mathematical model that has gained a lot of recent attention is the use of sparsity. Sparsity captures the idea that high dimensional signals often contain a very small amount of intrinsic information. Using this notion, one may design efficient lowdimensional representations of largescale data as well as robust reconstruction methods for those representations. Binary, or onebit, representations of data for example, arise naturally in many applications, and are appealing in both hardware implementations and algorithm design. In this talk, we provide a brief background to sparsity and 1bit measurements, and present new results on the problem of data classification with low computation and resource costs. We illustrate the utility of the proposed approach on recently acquired data about Lyme disease. 
Tue Oct 15 
Climate Seminar11:15am  Vincent Hall 570Climate and NonSmooth Dynamics Cameron Thieme, School of Mathematics 
Mon Oct 14 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Oct 14 
Student Number Theory Seminar3:35pm  Vincent Hall 1Arithmetic Speculation on a Combinatorial Lemma Eric Stuckey Abstract:Reflection groups are an object in classical geometry with deep connections to Lie theory, representation theory, algebraic geometry, invariant theory, and combinatorics. The first half of the talk will give a quick introduction to various flavors of reflection groups. In the second half of the talk I will state a lemma about a restricted class of reflection groups, and discuss an idea for how incorporating cyclotomic fields may allow us to remove that restriction. 
Mon Oct 14 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Applied and Computational Mathematics Seminar 
Mon Oct 14 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Oct 14 
Topology Seminar2:30pm  Ford Hall 110Second order terms in arithmetic statistics Craig Westerland, University of Minnesota Abstract:The machinery of the Weil conjectures often allows us to relate the singular cohomology of the complex points of a scheme to the cardinality of its set of points over a finite field. When we apply these methods to a moduli scheme, we obtain an enumeration of the objects the moduli parameterizes. It's rare that we can actually fully compute the cohomology of these moduli spaces, but homological stability results often give a first order approximation to the homology. In this talk, we'll explain how to obtain second order homological computations for a class of Hurwitz moduli spaces of branched covers; these yield second order terms in enumerating the moduli over finite fields. We may interpret these as second order terms in a function field analogue of the function which counts number fields, ordered by discriminant. Our second order terms match those of TaniguchiThorne/BhargavaShankarTsimerman in the cubic case, and give new predictions in other Galois settings. This is joint (and ongoing) work with Berglund, Michel, and Tran. 
Mon Oct 14 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Oct 11 
MCFAM Seminar5:30pm  Vincent Hall 16MCFAM Seminar 
Fri Oct 11 
Combinatorics Seminar3:30pm  Vincent Hall 570KazhdanLusztig Immanants for kPositive Matrices Sunita Chepuri Abstract:Immanants are matrix functionals that generalize the determinant. One notable family of immanants are the KazhdanLusztig immanants. These immanants are indexed by permutations and are defined as sums involving KazhdanLusztig polynomials. One notable property of KazhdanLustzig immanants is that they are nonnegative on totally positive matrices. We give a condition on permutations that allows us to extend this theorem to the setting of kpositive matrices. We also conjecture a larger class of permutations for which our theorem holds true. 
Fri Oct 11 
Probability Seminar2:30pm  Vincent Hall 311Probability Seminar 
Fri Oct 11 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Oct 11 
Special Events and Seminars1:25pm  Vincent Hall 213Trace Formula (continued) Steven Sperber, University of Minnesota 
Fri Oct 11 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305Data Science in Healthcare Yinglong Guo, UnitedHealth Group Abstract:UnitedHealth Group Research and Development (UHG R&D) is working on creating, validating, testing, and refining innovations in the healthcare industry. Our data science team provides technical solutions by applying various statistical and machine learning methods to a vast amount of data in order to answer research questions. In this talk, I will give a brief introduction to my daytoday experience as a data scientist. I will also discuss the methodology involved in several analyses of treatment outcomes for prostate cancer. 
Thu Oct 10 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Oct 10 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Oct 10 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar Mike Loper, University of Minnesota 
Thu Oct 10 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Wed Oct 09 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Oct 09 
PDE Seminar3:35pm  Vincent Hall 570Diffusion in the Mean for a Periodic Schrödinger Equation Perturbed by a Fluctuating Potential Shiwen Zhang, UMN Abstract:We consider the solution to a tightbinding, periodic Schrödinger equation with a random potential evolving stochastically in time. If the potential evolves according to a stationary Markov process we obtain a positive, finite diffusion constant for the evolution of the solution. More generally, we show that the square amplitude of the wave packet, after diffusive rescaling, converges to a solution of the heat equation. (Joint work with J. Schenker and Z. Tilocco at the Michigan State University). 
Wed Oct 09 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Automorphic Forms and Number Theory 
Tue Oct 08 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Oct 08 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Oct 08 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Oct 08 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Tue Oct 08 
IMA Data Science Lab Seminar1:25pm  Lind 305LectureParallel Transport Convolutional Neural Networks on Manifolds Rongjie Lai, Rensselaer Polytechnic Institute Abstract:Convolution has played a prominent role in various applications in science and engineering for many years. It is also the most important operation in convolutional neural networks (CNNs). There has been a recent growth of interests of research in generalizing CNNs on 3D objects, often represented as compact manifolds. However, existing approaches cannot preserve all the desirable properties of Euclidean convolutions, namely compactly supported filters, directionality, transferability across different manifolds. In this talk, I will discuss our recent work on a new way of defining convolution on manifolds via parallel transport. This geometric way of defining parallel transport convolution (PTC) provides a natural combination of modeling and learning on manifolds. PTC allows for the construction of compactly supported filters and is also robust to manifold deformations. I will demonstrate its applications to shape analysis using deep neural networks based on parallel transportation convolutional networks (PTCnet). Dr. Rongjie Lai received his Ph.D. degree in applied mathematics from the University of California, Los Angeles, He is currently an assistant professor at the Rensselaer polytechnic Institute. Dr. Lais research interests are mainly in modern scientific computing including developing mathematical and computational tools for analyzing and processing signals, images as well as unorganized data using methods of variational partial differential equations, computational differential geometry and learning. In 2018, Dr. Lai was granted an NSF CAREER award for his research in geometry and learning for manifoldstructured data in 3D and higher dimension. 
Tue Oct 08 
Climate Seminar11:15am  Vincent Hall 570Permafrost Response to Climate Change via Budykos Model Richard McGehee, UMN 
Mon Oct 07 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Nonuniqueness in Dynamical Systems Richard McGehee, University of Minnesota Abstract:Discontinuous vector fields arise naturally in some applications. In this presentation, a simple classical model of ocean circulation is introduced as an example of how discontinuities give rise to nonunique solutions. Standard bifurcation techniques often fail when the vector field is not smooth, and certainly fail when the vector field is discontinuous. However, some topological techniques seem to carry over, and a crude birfurcation theory can be extended to a large class of discontinuous systems. 
Mon Oct 07 
Student Number Theory Seminar3:35pm  Vincent Hall 1A Tour of the padic Representation Theory of GL_2 Katy Weber Abstract:We summarize the classification of representations of GL_2 over a padic field, emphasizing the relationship between these representations and automorphic forms and Lfunctions. Time permitting, we will also discuss Whittaker models of these representations and the CasselmanShalika formula. This talk is meant to be a sketch of these results and how they fit into the bigger picture, and should be accessible even if you are not very familiar with representation theory. 
Mon Oct 07 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Applied and Computational Mathematics Seminar 
Mon Oct 07 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Oct 07 
Topology Seminar2:30pm  Ford Hall 110Topology Seminar 
Mon Oct 07 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Oct 04 
MCFAM Seminar5:30pm  Vincent Hall 16RANDOM RULES AND THE ANCIENT HISTORY OF SIMULATION Arkady Shemyakin, University of St. Thomas Abstract:Modern approaches to simulation, involving Monte Carlo methods and randomized procedures of decisionmaking, are usually dated back to the mid20th century and the arrival of the computer era. Deeper history goes back to the 19th and even 18th centuries and involves such devices as Galtons board and Buffons needle. However, one can argue that long before the invention of computers, older devices such as dice and their predecessors have been effectively used for games and divination. The idea of this paper is to review the use of ancient randomizing devices to trace the history of simulation and random rules of decisionmaking. Special attention will be paid to some contemporary cultures, which have preserved some unique elements of their ancient history: native cultures of the Americas, the Celtic civilizations of Ireland and Scotland, and the indigenous peoples of Northern and Central Asia (Altai and Siberia).Bio: https://www.stthomas.edu/mathematics/faculty/arkadyshemyakin.html 
Fri Oct 04 
Probability Seminar3:30pm  Vincent Hall 311Invertibility of inhomogenuous heavytailed matrices Galyna Livshyts, Georgia Tech Abstract:We will show the sharp estimate on the behavior of the smallest singular value of random matrices under very general assumptions. One of the key steps in the proof is a result about the efficient discretization of the unit sphere in an ndimensional euclidean space. This result allows us to work with very general random matrices. The proof of the result will be outlined. Partially based on the joint work with Tikhomirov and Vershynin. 
Fri Oct 04 
Combinatorics Seminar3:30pm  Vincent Hall 570Higher cluster categories and QFT dualities Gregg Musiker Abstract:We present a unified mathematical framework that elegantly describes minimally supersymmetric gauge theories in various dimensions, and their dualities. Though this approach utilizes higher Ginzburg algebras and higher cluster categories (also known as mcluster categories), we show that the constructions can be given explicitly and combinatorially. We emphasize the connections to cluster algebras and two classes of examples: one class related to toric geometry and giving rise to brane bricks, which are 3dimensional analogues of certain bipartite graphs on surfaces, and one class corresponding to higher partial triangulations of surfaces. This is based on joint work with Sebastian Franco of City College of New York. No prior knowledge of Quantum Field Theories or Cluster Algebras will be assumed. 
Fri Oct 04 
Probability Seminar2:30pm  Vincent Hall 311Reconstruction problems on amenable graphs Ahmed El Alaoui, Stanford University Abstract:We consider the problem of reconstructing a hidden assignment of random variables (x_1, , x_n) sitting on the nodes of a graph, given noisy observations of pairs (x_u, x_v) for every edge (u,v) of the graph. Such problems have been extensively studied when the underlying graph is meanfield (e.g., the complete graph, ErdosRenyi, random regular, ), in which case the existence of a ``possiblebuthard phase where reconstruction is possible but computationally difficult is ubiquitous. In contrast, the picture is dramatically different when the graph is amenable. I will represent a generic result about the optimality of local algorithms for computing marginals under a somewhat strong model of side information. Next, I will focus on Z_2 synchronization (aka planted Ising model) on the Euclidean lattice with weaker side information, and discuss a renormalizationbased procedure for reconstructing the assignment. Joint work with Andrea Montanari. 
Fri Oct 04 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Oct 04 
Special Events and Seminars1:25pm  Vincent Hall 213"Trace Formula, I" Steven Sperber, University of Minnesota 
Thu Oct 03 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Oct 03 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Oct 03 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Linkage, and the licci conjecture on grade 3 perfect ideals Mahrud Sayrafi, University of Minnesota Abstract:Let Q be a regular local ring. An ideal I in Q is said to be licci if it is in the linkage class of a complete intersection. Christensen, Veliche and Weyman conjectured that a perfect ideal of grade 3 in Q is licci if and only if its free resolution corresponds to Dynkin diagrams. After introducing the theory of linkage, I will talk about the conjecture, how Dynkin diagrams are involved, and their approach in showing one direction of the conjecture in arXiv:1712.04016. 
Thu Oct 03 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Thu Oct 03 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305Language and Interaction in Minecraft Arthur Szlam, Facebook Abstract:I will discuss a research program aimed at building a Minecraft assistant, in order to facilitate the study of agents that can complete tasks specified by dialogue, and eventually, to learn from dialogue interactions. I will describe the tools and platform we have built allowing players to interact with the agents and to record those interactions, and the data we have collected. In addition, I will describe an initial agent from which we (and hopefully others) can iterate. 
Wed Oct 02 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Oct 02 
PDE Seminar3:35pm  Vincent Hall 570PDE Seminar 
Wed Oct 02 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Automorphic Forms and Number Theory 
Tue Oct 01 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Oct 01 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Oct 01 
Dynamical Systems2:30pm  Vincent Hall 209Relative equilibrium configurations of gravitationally interacting rigid bodies Rick Moeckel, University of Minnesota Abstract:Consider a collection of n rigid, massive bodies interacting according to their mutual gravitational attraction. A relative equilibrium motion is one where the entire configuration rotates rigidly and uniformly about a fixed axis all of the bodies are phase locked. Such a motion is possible only for special positions and orientations of the bodies. A minimal energy motion is one which has the minimum possible energy in its fixed angular momentum level. While every minimal energy motion is a relative equilibrium motion, the main result here is that a relative equilibrium motion of n >= 3 disjoint rigid bodies is never an energy minimizer. Since energy minimizers are the expected final states produced by tidal interactions, phase locking of 3 or more bodies will not occur. 
Tue Oct 01 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Tue Oct 01 
IMA Data Science Lab Seminar1:25pm  Lind 305Citizen Science and Machine Learning at Zooniverse Darryl Wright, University of Minnesota, Twin Cities Abstract:As researchers gather everlarger datasets there is an increasing demand for citizen science and reliance on machine learning. We will introduce Zooniverse, the world's largest citizen science platform, and show how citizen scientists are helping researchers extract meaningful information from their data. But the demand for citizen scientists and the volumes of data they are being asked to process is beginning to tax even the abilities of our 1.8 million volunteers. We will show how machine learning is being deployed to ease some of this burden and show how machine learning and citizen science can empower each other to process data more efficiently than either alone. 
Tue Oct 01 
Climate Seminar11:15am  Vincent Hall 570"An Introduction to Budyko's Energy Balance Model" Richard McGehee 
Mon Sep 30 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Sep 30 
Student Number Theory Seminar3:35pm  Vincent Hall 1Leading up to Dirichlets class number formula Dev Hegde Abstract:The talk will give a historical introduction to number theory leading up to Dirichlets class number formula which was one of the biggest achievements of analytic methods in number theory. No background is necessary to understand the talk. 
Mon Sep 30 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Applied and Computational Mathematics Seminar 
Mon Sep 30 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Sep 30 
Topology Seminar2:30pm  Ford Hall 110Mysterious Duality Sasha Voronov, University of Minnesota Abstract:Mysterious Duality was discovered by Iqbal, Neitzke, and Vafa in 2001. They noticed that toroidal compactifications of Mtheory lead to the same series of combinatorial objects as del Pezzo surfaces do, along with numerous mysterious coincidences: both toroidal compactifications and del Pezzo surfaces give rise to the exceptional series E_k; the Uduality group corresponds to the Weyl group W(E_k), arising also as a group of automorphisms of the del Pezzo surface; a collection of various M and Dbranes corresponds to a set of divisors; the brane tension is related to the area of the corresponding divisor, etc. The mystery is that it is not at all clear where this duality comes from. In the talk, I will present another series of mathematical objects: certain versions of multiple loop spaces of the sphere S^4, which are, on the one hand, directly connected to Mtheory and its combinatorics, and, on the hand, possess the same combinatorics as the del Pezzo surfaces. This is a report on an ongoing work with Hisham Sati. 
Mon Sep 30 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Sep 27 
MCFAM Seminar5:30pm  Vincent Hall 16Positive Matrices and Derivative Models Carlos Tolmasky, University of Minnesota Abstract:Principal components analysis has become widely used in a variety of fields. In finance and, more specifically, in the theory of interest rate derivative modeling, its use has been pioneered by R. Litterman and J. Scheinkman. Their key finding was that a few components explain most of the variance of treasury zerocoupon rates and that the first three eigenvectors represent level, slope and curvature changes on the curve. This result has been, since then, observed in various markets.Over the years, there have been several attempts at modeling correlation matrices displaying the observed effects as well as trying to understand what properties of the those matrices are responsible for the effect. Using recent results of the theory of positive matrices we characterize these matrices and, as an application, we shed light on some of the critiques to this methodology.Bio: http://mcfam.math.umn.edu/people/carlostolmasky 
Fri Sep 27 
Combinatorics Seminar3:30pm  Vincent Hall 570A positivity phenomenon in Elser's Gaussiancluster percolation model Galen DorpalenBarry, University of Minnesota Abstract:Veit Elser proposed a random graph model for percolation in which physical dimension appears as a parameter. Studying this model combinatorially leads naturally to the consideration of numerical graph invariants which we call \textit{Elser numbers} \text{els}_k(G), where G is a connected graph and k a nonnegative integer. Elser had proven that \text{els}_1(G)=0 for all G. By interpreting the Elser numbers as Euler characteristics of appropriate simplicial complexes called \emph{nucleus complexes}, we prove that for all graphs G, they are nonpositive when k=0 and nonnegative for k\geq2. The last result confirms a conjecture of Elser. At the end, we will present an open problem naturally arising from our proof of Elser's conjecture. 
Fri Sep 27 
Probability Seminar2:30pm  Vincent Hall 311Random matrices, operators and analytic functions Benedek Valko, UW Madison Abstract:The finite circular betaensembles and their point process scaling limit can be represented as the spectra of certain random differential operators. These operators can be realized on a single probability space so that the point process scaling limit is a consequence of an operator level limit. The construction allows the derivation of the scaling limit of the normalized characteristic polynomials of the finite models to a random analytic function. I will review these representations and constructions, and present a couple of applications. Joint with B. Virág (Toronto). 
Fri Sep 27 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Sep 27 
Special Events and Seminars1:25pm  Vincent Hall 213A padic analytic interpolation of a finite field character, II Steven Sperber, University of Minnesota 
Fri Sep 27 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 305Sampling from an Alternate Universe: Overview of Privacypreserving Synthetic Data Christine Task, Knexus Research Corporation Abstract:Data accessibility is importantpublicly available datasets support vital social science research, social programs and datainformed governance. In recent years, an increasing amount of data has been curated and made generally available through sites like data.gov, IPUMS, and other resources, fueling the progress of research in Big Data. However, data with the most potential value for public good can also be the most privacy sensitivesuch as data on abuse, STDS, extreme poverty, or mental health. These datasets exist, but may be redacted or entirely withheld from public view due to legal restrictions and the very real danger that anonymized individuals may be reidentified. Privacypreserving synthetic data provides a pathway to publicly release datasets that contain very sensitive information. The basic process consists of three parts: A generative model is built which captures the distribution of the original sensitive data, perturbation steps are applied to the model to improve its privacy properties (either formal or heuristicbased), and then the model is used to synthesize a new data set of synthetic individuals. The synthetic dataset preserves the significant properties of the original data, but because it contains no real people, it can be safely released to the public. When the distributional difference between the real and synthetic data mimics the difference between two subsamples of the original data, i.e. when privacy error mimics sampling error, we can think of the synthetic data as survey results from a parallel dimension: The same pattern of information as the original data, with no real people. In this talk, I'll cover approaches to creating synthetic data, the difference between formal and heuristicbased privacy, and, importantly, quality metrics used to verify that the synthetic data is a good substitute for the original data (a challenging problem itself in a high dimensional feature space). High quality synthetic data is a rapidly progressing research area, with both promising success stories and an exciting frontier of open problems. 
Thu Sep 26 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Sep 26 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Sep 26 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Global Sections of Toric Vector Bundles Jorin Schug Abstract:This talk will continue to follow the "Parliament of Polytopes" paper by Di Rocco, Jabbusch, and Smith. I'll discuss the result that the Tequivariant generators for the global sections of a toric vector bundle E correspond to the lattice points in the parliament of polytopes for E and look to understand this result for some examples, including direct sums of line bundles. 
Thu Sep 26 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Wed Sep 25 
PDE Seminar3:35pm  Vincent Hall 570Random Tug of War games for the pLaplacian Marta Lewicka, University of Pittsburgh Abstract:We propose a new dynamic programming principle related to the Dirichlet problem for the homogeneous pLaplace equation in connection with the Tug of War games with noise. We also discuss similar approximations in presence of the Robin boundary conditions. For the proofs, we use martingale techniques involving various couplings of random walks and yielding estimates on the involved probabilistic representations. 
Wed Sep 25 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Sep 25 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Automorphic Forms and Number Theory 
Tue Sep 24 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Sep 24 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Sep 24 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Sep 24 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology TBA 
Tue Sep 24 
IMA Data Science Lab Seminar1:25pm  Lind 305The Geometry of Ambiguity in Onedimensional Phase Retrieval Dan Edidin, University of Missouri Abstract:The phase retrieval problem is the problem of reconstructing an unknown signal from its Fourier intensity function. This problem has a long history in physics and engineering and occurs in contexts such as Xray crystallography, speech processing and computational biology. As stated, the phase retrieval problem is illposed as there may be up to $2^N$ nonequivalent signals (called ambiguities) with the same Fourier intensity function. To enforce uniqueness additional constraints must be imposed. In this talk we discuss the geometry of the space of ambiguities obtained by varying the signal. By understanding this geometry we prove a general result characterizing constraints that enforce a unique solution to the phase retrieval problem. This result was applied in work with Tamir Bendory and Yonina Eldar on blind phaseless shorttime Fourier transform recovery. 
Tue Sep 24 
Climate Seminar11:15am  Vincent Hall 570An Introduction to Planetary Energy Balance Richard McGehee, University of Minnesota 
Mon Sep 23 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Sep 23 
Student Number Theory Seminar3:35pm  Vincent Hall 1Elliptic Curves Claire Frechette 
Mon Sep 23 
Applied and Computational Mathematics Seminar3:35pm  Vincent Hall 6Applied and Computational Mathematics Seminar 
Mon Sep 23 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Sep 23 
Topology Seminar2:30pm  Ford Hall 110Homology class of DeligneLusztig varieties Dongkwan Kim, University of Minnesota Abstract:Since first defined by Deligne and Lusztig, a DeligneLusztig variety has become unavoidable when studying the representation theory of finite groups of Lie type. This is a certain subvariety of the flag variety of the corresponding reductive group, and its cohomology groups are naturally endowed with the action such finite groups, which in turn gives a decomposition of irreducible representations called Lusztig series. In this talk, I will briefly discuss the background of DeligneLusztig theory and provide a formula to calculate the homology class of DeligneLusztig varieties in the Chow group of the flag variety. If time permits, I will also discuss their analogues. 
Mon Sep 23 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Sep 20 
MCFAM Seminar5:30pm  Vincent Hall 16MCFAM Student Research  Outcome analysis of Indexed Universal Life Insurance based on Monte Carlo Simulation Songyu Yan and Ian Luo, University of Minnesota Abstract:Indexed Universal Life (IUL) Insurance was developed to harness thepower of equity market returns with downside protection. However IUL iscurrently illustrated using a static credited rate which masks market returnvolatility inherent in its structure. As a result, what policyholders see as expectedperformance maybe far from reality in many cases. In our research, we modeledthe pricing algorithms of major IUL products and applied scenario testing usingMonte Carlo simulation of indices used in IUL products. The statistical variance ofindices leads to vastly different results than what is currently demonstrated inmany cases, and this variance may cause the failure of the policy. Our researchindicates a better method for demonstrating policy performance would be basedon an outcome analysis rather than the static method currently in use.Bios: Songyu Yan: https://www.linkedin.com/in/songyuyan826bb2126/ Ian Luo: https://www.linkedin.com/in/yifeiluo9051b1170/ 
Fri Sep 20 
Combinatorics Seminar3:30pm  Vincent Hall 570Cyclic Sieving for planet partitions and symmetry Sam Hopkins., University of Minnesota Abstract:The cyclic sieving phenomenon of Reiner, Stanton, and White says that we can often count fixed points for a cyclic group acting on a combinatorial set by plugging roots of unity into a polynomial related to this set. One of the most impressive instances of the cyclic sieving phenomenon is a theorem of Rhoades asserting that the set of plane partitions in a rectangular box under the action of promotion exhibits cyclic sieving. In Rhoades's result the sieving polynomial is the size generating function for these plane partitions, which has a wellknown product formula due to MacMahon. We extend Rhoades's result by studying the interaction of promotion with symmetries of plane partitions. We obtain cyclic sievinglike formulas in this context where the relevant polynomial is the size generating function for symmetric plane partitions, whose product formula was conjectured by MacMahon and proved by Andrews. We then go on to consider the way the symmetries interact with rowmotion, another operator acting on plane partitions which is closely related to promotion. We end by explaining the connection of our work to some earlier conjectures we made concerning rowmotion acting on the Ppartitions of various triangular posets P. 
Fri Sep 20 
Probability Seminar2:30pm  Vincent Hall 311Probability Seminar 
Fri Sep 20 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Sep 20 
Special Events and Seminars1:25pm  Vincent Hall 213A padic analytic interpolation of a finite field character Steven Sperber, University of Minnesota 
Fri Sep 20 
IMA/MCIM Industrial Problems Seminar1:25pm  Lind 409SIAM Industrial Panel ,  
Thu Sep 19 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Sep 19 
Colloquium3:35pm  Vincent Hall 16The Langlands Program: An Introduction and Recent Progress Solomon Friedberg,, Boston College Abstract:The Langlands Program, connecting algebra, analysis and geometry in diverse ways, is foundational to modern number theory. I will introduce this program and indicate some recent progress. As we shall see, a great deal still remains to be done. 
Thu Sep 19 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Sep 19 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar 
Thu Sep 19 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570D=4, N=1 Compactifications of Maximal Supergravities via Generalised Geometry  Kahler potentials, superpotentials and moduli David Tennnyson, Imperial College London Abstract:We analyse compactifications of 11 dimensional or type II supergravity down to 4 dimensional Minkowski space for generic flux and generic internal Killing spinors. We note the failure of conventional differential geometry to capture the generic features of the theory and show that the correct formalism comes in the form of a closed form Leibniz algebroid  or as we call it in the physics community, generalised geometry. Our structure is similar to the generalised geometry of Hitchin, but now the structure group is the noncompact exceptional group E_{7(7)}x R^{+}. It turns out that having N=1 supersymmetry in the effective theory on Minkowski space is equivalent to an integrable SU(7) structure on the generalised tangent bundle. We provide the tensors that define the SU(7) structure and give the integrability conditions. Finally we provide an expression for the Kahler potential on the space of structures, the superpotential of the lower dimensional theory, and we explore the moduli of these structures giving explicit answers in certain cases. 
Wed Sep 18 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Sep 18 
PDE Seminar3:35pm  Vincent Hall 570PDE Seminar 
Wed Sep 18 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Siegel's extensions of Epstein zeta functions as Eisenstein series Paul Garrett, University of Minnesota 
Tue Sep 17 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Sep 17 
Colloquium3:30pm  Vincent Hall 16Colloquium 
Tue Sep 17 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Sep 17 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology 
Tue Sep 17 
IMA Data Science Lab Seminar1:25pm  Lind 305Optimal Recovery under Approximability Models, with Applications Simon Foucart, Texas A & M University Abstract:For functions acquired through point evaluations, is there an optimal way to estimate a quantity of interest or even to approximate the functions in full? We give an affirmative answer to this question under the novel assumption that the functions belong to a model set defined by approximation capabilities. In fact, we produce implementable linear algorithms that are optimal in the worstcase setting. We present applications of the abstract theory in atmospheric science and in system identification. Dr. Simon Foucart earned a Masters of Engineering from the Ecole Centrale Paris and a Masters of Mathematics from the University of Cambridge in 2001. In 2006, he received his Ph.D. in Mathematics at the University of Cambridge, specializing in Approximation Theory. After two postdoctoral positions at Vanderbilt University and Université Paris 6, he joined Drexel University in 2010 before moving to the University of Georgia in 2013. Since 2015, he has been with Texas A&M University, where is now professor. His recent work focuses on the field of Compressive Sensing, whose theory is exposed in the book A Mathematical Introduction to Compressive Sensing he coauthored with Holger Rauhut. Dr. Foucarts research was recognized by the Journal of Complexity, from which he received the 2010 Best Paper Award. Dr. Foucarts current interests also include the mathematical aspects of Metagenomics, Optimization, Deep Learning and Data Science at Large 
Tue Sep 17 
Climate Seminar11:15am  Vincent Hall 570The Scientific Case for Anthropogenic Warming II Richard McGehee, University of Minnesota 
Mon Sep 16 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Applied and Computational Math Colloquium 
Mon Sep 16 
Student Number Theory Seminar3:35pm  Vincent Hall 1A Brief Introduction to LFunctions Joe Dickinson Abstract:Like Andy's talk last week, this week will be another introductory talk; the topic is Lfunctions. We will start with a discussion of Dirichlet's use of Lseries to show the infinitude of primes in arithmetic progressions, then proceed to how Lfunctions have become a major area of investigation. We will discuss only a sampling of topics, with the goal of motivating interest and setting the stage for future talks. 
Mon Sep 16 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Sep 16 
Topology Seminar2:30pm  Ford Hall 110Transfer in the homology and cohomology of categories Peter Webb, University of Minnesota Abstract:The cohomology of a category has many properties that extend those that are familiar when the category is a group. Second cohomology classifies equivalence classes of category extensions, first cohomology parametrizes conjugacy classes of splittings, first homology is the abelianization of the fundamental group, and second homology has a theory that extends that of the Schur multiplier. Defining restriction and corestriction maps on the homology of categories is problematic: most attempts to do this require induction and restriction functors to be adjoint on both sides, and this typically does not happen with categories. We describe an approach to defining these maps that includes all the situations where they can be defined in group cohomology, at least when the coefficient ring is a field. The approach uses bisets for categories, the construction by Bouc and Keller of a map on Hochschild homology associated to a bimodule, and the realization by Xu of category cohomology as a summand of Hochschild cohomology. 
Mon Sep 16 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Sep 13 
MCFAM Seminar5:30pm  Vincent Hall 16MFM Alumni/Student Panel: How the MFM Prepares You to Enter the Field of Quantitative Finance MFM Alumni/Student Panel, Master of Financial Mathematics Program (MFM) Abstract:Learn from current students and MFM alumni in industry about the benefits of this professional master program. Panelists will talk about what attracted them to the program, how to make the most of your time in the MFM and why the practical, realworld learning helps you land jobs in quantitative risk analysis, hedging, trading, portfolio management, fintech, data analytics and other jobs that are hot in the field right now. 
Fri Sep 13 
Combinatorics Seminar3:30pm  Vincent Hall 570Combinatorics Seminar 
Fri Sep 13 
Probability Seminar2:30pm  Vincent Hall 311Critical behavior for percolation on graphs with given degrees Souvik Dhara, MIT Abstract:We discuss critical behavior of percolation on finite random networks. In a seminal paper, Aldous (1997) identified the scaling limit for the component sizes in the critical window of phase transition for the ErdosRenyi random graph (ERRG). Subsequently, there has been a surge in the literature, revealing several interesting scaling limits of these critical components, namely, the component size, diameter, or the component itself when viewed as a metric space. Fascinatingly, when the third moment of the asymptotic degree distribution is finite, many random graph models have been shown to exhibit a universality phenomenon in the sense that their scaling exponents and limit laws are the same as the ERRG. In contrast, when the asymptotic degree distribution is heavytailed (having an infinite third moment), the limit law turns out to be fundamentally different from the ERRG case and in particular, becomes sensitive to the precise asymptotics of the highest degree vertices. In this talk, we will focus on random graphs with a prescribed degree sequence. We start by discussing recent scaling limit results, and explore the universality classes that arise from heavytailed networks. Of particular interest is a new universality class that arises when the asymptotic degree distribution has an infinite second moment. Not only it gives rise to a completely new universality class, it also exhibits several surprising features that have never been observed in any other universality class so far. This is based on joint works with Shankar Bhamidi, Remco van der Hofstad, Johan van Leeuwaarden and Sanchayan Sen. 
Fri Sep 13 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Sep 13 
Special Events and Seminars1:25pm  Vincent Hall 213"pAdic Cohomology, Exponential Sums, and Hypergeometric Functions TBA 
Fri Sep 13 
Probability Seminar9:30am CANCELLED 
Thu Sep 12 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Sep 12 
Colloquium3:35pm  Vincent Hall 16Colloquium 
Thu Sep 12 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar 
Thu Sep 12 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology 
Wed Sep 11 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Sep 11 
PDE Seminar3:35pm  Vincent Hall 570Parabolic problems with rough coefficients Pierre Portal,, Australian National University Abstract:Using form methods, one can solve linear parabolic PDE in divergence form with $L^2$ data in appropriate energy spaces, even when the coefficients are merely bounded measurable in time and space, and no maximum principle is available. This goes back, at least, to the work of Lions and his school in the 1950s. When dealing with $L^p$ data, it is not so clear which $L^p$ like solution space one should use as a replacement of Lions energy space. Depending on the choice, one can solve, for instance, time dependent single equations (Aronson 1968), time independent systems for a range of values of $p$ (Auscher 2005), or stochastic problems with some spatial regularity (starting with Krylov 1994). This summarises joint works with Pascal Auscher, Sylvie Monniaux, Jan van Neerven, and Mark Veraar. 
Wed Sep 11 
Automorphic Forms and Number Theory3:35pm  Vincent Hall 213Automorphic Forms and Number Theory 
Tue Sep 10 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Sep 10 
Colloquium3:30pm  VinH 16Colloquium 
Tue Sep 10 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Sep 10 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology 
Tue Sep 10 
IMA Data Science Lab Seminar1:25pm  Lind 305Taming Nonconvexity: From Smooth to Nonsmooth Problems and Beyond Ju Sun, University of Minnesota, Twin Cities Abstract:Most applied problems we encounter can be naturally written as nonconvex optimization, for which In this talk, I will describe our recent effort in bridging the mysterious theorypractice gap for nonconvex optimization, in the context of solving practical problems in signal processing, machine learning, and scientific imaging. 1) I will highlight a family of smooth nonconvex problems that can be solved to global optimality using simple numerical methods, independent of initialization. 2) The discovery, however, does not cover nonsmooth functions, which are frequently used to encode structural objects (e.g., sparsity) or achieve robustness. I will introduce tools from nonsmooth analysis, and demonstrate how nonsmooth, nonconvex problems can also be analyzed and solved in a provable manner. 3) Toward the end, I will provide examples to show how innovative problem formulation and physical design can help to tame nonconvexity. Ju Sun is an assistant professor at the computer science & engineering department, University of Minnesota at Twin Cities. Prior to this, he was a postdoctoral scholar at Stanford University, 
Tue Sep 10 
Climate Seminar11:15am  Vincent Hall 570"The Scientific Case for Anthropogenic Warming" Richard McGehee, University of Minnesota 
Mon Sep 09 
Applied and Computational Math Colloquium3:35pm  Vincent Hall 207Emergent behavior in collective dynamics Eitan Tadmor, University of Maryland Abstract:Collective dynamics is driven by alignment that tend to selforganize the crowd and by different external forces that keep the crowd together. Different emerging equilibria are selforganized into clusters, flocks, tissues, parties, etc. I will overview recent results on the hydrodynamics of largetime, largecrowd collective behavior, driven by different rules of engagement. In particular, I address the question how shortrange interactions lead, over time, to the emergence of longrange patterns, comparing geometric vs. topological interactions. 
Mon Sep 09 
Student Number Theory Seminar3:35pm  Vincent Hall 1Student Number Theory Seminar 
Mon Sep 09 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Sep 09 
Topology Seminar2:30pm  Ford Hall 110Cohomology of the space of complex irreducible polynomials in several variables Weiyan Chen, University of Minnesota Abstract:We will show that the space of complex irreducible polynomials of degree d in n variables satisfies two forms of homological stability: first, its cohomology stabilizes as d increases, and second, its compactly supported cohomology stabilizes as n increases. Our topological results are inspired by counting results over finite fields due to Carlitz and Hyde. 
Mon Sep 09 
Cockburn's Seminar2:30pm  Ford Hall B15Cockburn's Seminar 
Fri Sep 06 
Combinatorics Seminar3:30pm  Vincent Hall 570Combinatorics Seminar 
Fri Sep 06 
Probability Seminar2:30pm  Vincent Hall 311Probability Seminar 
Fri Sep 06 
Reading Seminar on Automorphic Forms1:30pm  Vincent Hall 1Reading Seminar on Automorphic Forms 
Fri Sep 06 
Probability Seminar9:30am CANCELLED 
Thu Sep 05 
Student Combinatorics Seminar4:40pm  Vincent Hall 570Student Combinatorics and Algebra seminar 
Thu Sep 05 
Colloquium3:35pm  Vincent Hall 16Colloquium  Canceled Alina Chertock, NSCU Abstract:Chemotaxis is a movement of microorganisms or cells towards the areas of high concentration of a certain chemical, which attracts the cells and may be either produced or consumed by them. In its simplest form, the chemotaxis model is described by a system of nonlinear PDEs: a convectiondiffusion equation for the cell density coupled with a reaction diffusion equation for the chemoattractant concentration. It is wellknown that solutions of such systems may develop spiky structures or even blow up in finite time provided the total number of cells exceeds a certain threshold. This makes development of numerical methods for chemotaxis systems extremely delicate and challenging task. In this talk, I will present a family of highorder numerical methods for the KellerSegel chemotaxis system and several related models. Applications of the proposed methods to to multiscale and coupled chemotaxisfluid system and will also be discussed. 
Thu Sep 05 
Commutative Algebra Seminar2:30pm  Vincent Hall 209Commutative Algebra Seminar 
Thu Sep 05 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology 
Wed Sep 04 
Student Number Theory Seminar3:35pm  Vincent Hall 6Student Number Theory Seminar 
Wed Sep 04 
PDE Seminar3:35pm  Vincent Hall 570PDE Seminar 
Tue Sep 03 
Special Events and Seminars4:30pm  Vincent Hall 301Arithmetic Geometry Seminar 
Tue Sep 03 
Colloquium3:30pm  VinH 16Colloquium 
Tue Sep 03 
Dynamical Systems2:30pm  Vincent Hall 209Dynamical Systems Seminar 
Tue Sep 03 
Differential Geometry and Symplectic Topology Seminar1:25pm  Vincent Hall 570Differential Geometry and Sympletic Topology 
Tue Sep 03 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Sep 02 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Fri Aug 30 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Aug 30 
Probability Seminar9:30am CANCELLED 
Thu Aug 29 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Tue Aug 27 
Climate Seminar11:15am  Vincent Hall 570Climate Seminar TBA 
Mon Aug 26 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Fri Aug 23 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Aug 23 
Probability Seminar9:30am CANCELLED 
Mon Aug 19 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Fri Aug 16 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Aug 16 
Probability Seminar9:30am CANCELLED 
Wed Aug 14 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Mon Aug 12 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Aug 12 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Fri Aug 09 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Aug 09 
Probability Seminar9:30am CANCELLED 
Wed Aug 07 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Mon Aug 05 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Aug 05 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Fri Aug 02 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Aug 02 
Probability Seminar9:30am CANCELLED 
Wed Jul 31 
Combinatorics Seminar3:35pm  Vincent Hall 16Hurwitz action of reflection factorizations of Coxeter elements Sophiane Yahiatene, Bielefeld University Abstract:In the talk we will investigate a natural braid group action on factorizations of elements in reflection groups. In particular, we will consider reflection factorizations of Coxeter elements in Coxeter groups of finite rank and state conditions whether two factorizations lie in the same orbit under the natural action. The presented result extends the investigation of Lewis  Reiner (arXiv:1603.05969) to arbitrary Coxeter groups of finite rank. (j.w. Patrick Wegener) 
Wed Jul 31 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Mon Jul 29 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jul 29 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Fri Jul 26 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Jul 26 
Probability Seminar9:30am CANCELLED 
Wed Jul 24 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Tue Jul 23 
Combinatorics Seminar3:35pm  Vincent Hall 113Enumeration of bounded lecture hall tableaux Jang Soo Kim,, Sungkyunkwan University Abstract:Recently Corteel and Kim introduced lecture hall tableaux in their study of multivariate little qJacobi polynomials. In this talk, we enumerate bounded lecture hall tableaux. We show that their enumeration is closely related to standard and semistandard Young tableaux. We also show that the number of bounded lecture hall tableaux is the coefficient of the Schur expansion of s?(m+y1,...,m+yn). To prove this result, we use two main tools: nonintersecting lattice paths and bijections. In particular we use ideas developed by Krattenthaler to prove bijectively the hook content formula. This is joint work with Sylvie Corteel. 
Mon Jul 22 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jul 22 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Fri Jul 19 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Jul 19 
Probability Seminar9:30am CANCELLED 
Thu Jul 18 
Combinatorics Seminar3:35pm  Vincent Hall 16Fibers of maps to totally nonnegative spaces and the FominShapiro Conjecture Patricia Hersh, North Carolina State University Abstract:Anders Björner and Joseph Bernstein raised the question of finding regular CW complexes naturally arising from representation theory having the intervals of Bruhat order as their posets of closure relations. Sergey Fomin and Michael Shapiro conjectured a solution, namely the link of the identity in the totally nonnegative real part of the unipotent radical of a Borel in a semisimple, simply connected algebraic group defined and split over the reals together with a family of related spaces indexed by the different Coxeter group elements. The FominShapiro conjecture indeed proved to be true, with the proof utilizing an interpretation of these stratified spaces as images of an intriguing family of maps  maps also arising in work of Lusztig related to canonical bases. I will start by reviewing some highlights of this story, then turn to recent joint work with Jim Davis and Ezra Miller regarding the structure of the fibers of these same maps. 
Wed Jul 17 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Mon Jul 15 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jul 15 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Fri Jul 12 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Jul 12 
Probability Seminar9:30am CANCELLED 
Wed Jul 10 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Mon Jul 08 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jul 08 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Fri Jul 05 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Jul 05 
Probability Seminar9:30am CANCELLED 
Wed Jul 03 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Mon Jul 01 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jul 01 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Fri Jun 28 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Jun 28 
Probability Seminar9:30am CANCELLED 
Wed Jun 26 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Mon Jun 24 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jun 24 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Fri Jun 21 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Jun 21 
Probability Seminar9:30am CANCELLED 
Wed Jun 19 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Mon Jun 17 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jun 17 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Fri Jun 14 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Jun 14 
Probability Seminar9:30am CANCELLED 
Wed Jun 12 
Special Events and Seminars1:30pm  Vincent Hall 364Summer Student Representation Theory Seminar 
Mon Jun 10 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Mon Jun 10 
Special Events and Seminars1:30pm  Vincent Hall 364Basic Operations on Representations Andy Hardt Abstract:We continue our crash course in finite group representation theory by looking at some important operations on representations. We start by defining the group algebra of a finite group; group representations naturally biject with modules over the group algebra. After that, we'll talk through a variety of ways to construct new representations from old, such as restriction, induction, inflation, tensor product, and we may even squeeze in symmetric and exterior powers. 
Fri Jun 07 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri Jun 07 
Probability Seminar9:30am CANCELLED 
Thu Jun 06 
Combinatorics Seminar3:35pm  Vincent Hall 113Chicken Nuggets and Numerical Semigroups Ayomikun Adeniran, Texas A&M Abstract:A numerical semigroup is a subset of N that is closed under addition, contains 0 and has finite complement in N. There are several fundamental invariants of a numerical semigroup S among which are the Frobenius number and genus of S, denoted F(S) and g(S), respectively. The quotient of a numerical semigroup S by a positive integer d is the set S/d={xdx?S} which is also a numerical semigroup. In this talk, I will present some recent results showing the relation between the genus of S/d and the genus of S. If time permits, we will also talk about identities relating the Frobenius numbers and the genus of quotients of numerical semigroups that are generated by certain types of arithmetic progressions. This is joint work with S. Butler, C. Defant, Y. Gao, P.E. Harris, C. Hettle, Q. Liang, H. Nam, and A. Volk. 
Wed Jun 05 
Special Events and Seminars2:00pm  Vincent Hall 570AWM Talk Mimi Boutin 
Tue Jun 04 
Special Events and Seminars3:35pm  Vincent Hall 113Special Events and Seminars 
Tue Jun 04 
Combinatorics Seminar3:35pm  Vincent Hall 113Counting core partitions and numerical semigroups using polytopes Hayan Nam, University of California at Irvine Abstract:A partition is an aacore partition if none of its hook lengths are divisible by aa. It is well known that the number of aacore partitions is infinite and the number of simultaneous (a,b)(a,b)core partitions is a generalized Catalan number if aa and bb are relatively prime. In the first half of the talk, we give an expression for the number of simultaneous (a1,a2, ,ak)(a1,a2, ,ak)core partitions that is equal to the number of integer points in a polytope. In the second half, we discuss objects closely related to core partitions, called numerical semigroups, which are additive monoids that have finite complements in the set of nonnegative integers. For a numerical semigroup SS, the genus of SS is the number of elements in ??SN?S and the multiplicity is the smallest nonzero element in SS. In 2008, BrasAmorós conjectured that the number of numerical semigroups with genus gg is increasing as gg increases. Later, Kaplan posed a conjecture that implies BrasAmorós conjecture. In this talk, we prove Kaplan's conjecture when the multiplicity is 4 or 6 by counting the number of integer points in a polytope. Moreover, we find a formula for the number of numerical semigroups with multiplicity 4 and genus gg. 
Mon Jun 03 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Fri May 31 
Climate Seminar11:15am  570 Vincent HallClimate Change Seminar TBA 
Fri May 31 
Probability Seminar9:30am CANCELLED 
Wed May 29 
Special Events and Seminars1:30pm  Vincent Hall 206Informal Fluids Seminar Raj Beekie 
Mon May 27 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Fri May 24 
Probability Seminar9:30am CANCELLED 
Tue May 21 
Math Physics Seminar12:20pm  Vincent Hall 209Second quantization of elliptic CalogeroSutherland models Bjorn Berntson Abstract:CalogeroSutherland models are a class of completely integrable (quantum) manybody systems. In the most general case, particles interact pairwise through an elliptic potential. We discuss the second quantization of several elliptic CalogeroSutherland models. In degenerate (trigonometric, rational) cases, there is a wellstudied correspondence between CalogeroSutherland systems and BenjaminOno equations, a nonlinear, integrable integrodifferential equation. We discuss the correspondence in the elliptic regime, where second quantization of a particular system leads to a new twocomponent elliptic BenjaminOno equation. We construct a Lax pair for this equation via a RiemannHilbert problem on the torus. This is joint work with Edwin Langmann and Jonatan Lenells. 
Mon May 20 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Fri May 17 
Probability Seminar9:30am CANCELLED 
Thu May 16 
Math Club Seminar12:20pm  Vincent Hall 570Math Club 
Thu May 16 
Climate Seminar11:15am  Vincent Hall 570Climate Change Seminar TBA 
Tue May 14 
Special Events and Seminars3:30pm  Vincent Hall 570Singularity formation for some solutions of the incompressible Euler equation Tarek Elgindi Abstract:We describe a recent construction of selfsimilar blowup solutions of the incompressible Euler equation. A consequence of the construction is that there exist finiteenergy $C^{1,a}$ solutions to the Euler equation which develop a singularity in finite time for some range of $a>0$. The approach we follow is to isolate a simple nonlinear equation which encodes the leading order dynamics of solutions to the Euler equation in some regimes and then prove that the simple equation has stable selfsimilar blowup solutions. 
Tue May 14 
Math Physics Seminar12:30pm  Vincent Hall 2093rd order symmetries for systems on the 2sphere and the 2 twosheet 2hyperboloid  Superintegrability and cubic algebras Willard Miller, University of Minnesota (Joint with Ian Marquette, University of Queensland, and Bjorn Berntson, KTH Royal Institute of Techn Abstract:There are many papers concerning 3rd and higher order superintegrable systems on 2D Euclidean space, particularly by Pavel Winternitz, his students and collaborators. However, we are not aware of similar studies on nonflat spaces. We decided to study the 2sphere (with separation in polar coordinates) and the 2hyperboloid (with separation in horospherical coordinates). The computations were very complex for these nonflat systems and the results less rich than for flat space, which is to be expected. In each case we have a Hamiltonian operator H a 2nd order symmetry operator A and compute a 3rd order symmetry operator B. a nonzero B. They fall into 4 classes: 1) Systems that are 2nd order superintegrable, 2) Systems that are 3rd order superintegrable but do not generate a cubic algebra, 3) Systems with algebraically dependent generators A and B, 4) Systems that are 3rd order superintegrable with a cubic algebra. We pay special attention to the class 3 cases which also occur for Euclidian space with little change. We call these functionally dependent superintegrable systems, and show that they always permit a computation of the A eigenfunctions by simple quadrature. For the hyperboloid we show that the TTW method applied to a 2nd order 
Tue May 14 
Climate Seminar11:15am  Vincent Hall 570Climate Change Seminar TBA 
Mon May 13 
Topology Seminar3:30pm  Vincent Hall 301Topology Seminar: TBA 
Fri May 10 
First Year Seminar5:30pm  Vincent 364First Year Seminar TBA 
Fri May 10 