epshteyn (at) math.utah.edu)
January 9. Special Applied Math Seminar.
Speaker: Ricardo Alonso, Department of Mathematics, PUC-Rio
Title: The 1-D dissipative Boltzmann equation
Abstract: We discuss elementary properties of the 1-D dissipative Boltzmann equation. In particular, we show the optimal cooling rate of the model, give existence and uniqueness of measure solutions, and prove the existence of a non-trivial self-similar profile.
January 13 (Friday). Special Applied Math/Statistics/Stochastics Seminar
Note Time, 4:15pm - 5:15pm and Place LCB 222.
Speaker: Dane Taylor,Department of Mathematics, University of North Carolina-Chapel Hill
Title: Optimal layer aggregation and enhanced community detection in multilayer networks
Abstract: Inspired by real-world networks consisting of layers that encode different types of connections, such as a social network at different instances in time, we study community structure in multilayer networks. We study fundamental limitations on the detectability of communities by developing random matrix theory for the dominant eigenvectors of matrices that encode random networks. Specifically, we study modularity matrices that are associated an aggregation of network layers. Layer aggregation can be beneficial when the layers are correlated, and it represents a crucial step for discretizing time-varying networks (whereby time layers are binned into time windows). We explore two methods for layer aggregation: summing the layers' adjacency matrices and thresholding this summation at some value. We identify layer-aggregation strategies that minimize the detectability limit, indicating good practices (in the context of community detection) for how to aggregate layers, discretize temporal networks, and threshold pairwise-interaction data matrices.
January 18 (Wednesday). Special Applied Math/Statistics/Stochastics Seminar.
Note Time, Wednesday 4pm and Place JWB 335.
Speaker: Wenjing Liao, Department of Mathematics, Johns Hopkins University
Title: Multiscale adaptive approximations to data and functions near low-dimensional sets
Abstract: High-dimensional data are often modeled as samples from a probability measure in $R^D$, for $D$ large. We study data sets exhibiting a low-dimensional structure, for example, a $d$-dimensional manifold, with $d$ much smaller than $D$. In this setting, I will present two sets of problems: low-dimensional geometric approximation to the manifold and regression of a function on the manifold. In the first case we construct multiscale low-dimensional empirical approximations to the manifold and give finite-sample performance guarantees. In the second case we exploit these empirical geometric approximations of the manifold to construct multiscale approximations to the function. We prove finite-sample guarantees showing that we attain the same learning rates as if the function was defined on a Euclidean domain of dimension $d$. In both cases our approximations can adapt to the regularity of the manifold or the function eve when this varies at different scales or locations. All algorithms have complexity $C n\log (n)$ where $n$ is the number of samples, and the constant $C$ is linear in $D$ and exponential in $d$.
January 30. Special Applied Math Seminar.
Speaker: Michele Coti Zelati, Department of Mathematics, University of Maryland College Park
Title: Stochastic perturbations of passive scalars and small noise inviscid limits
Abstract: We consider a class of invariant measures for a passive scalar driven by an incompressible velocity field on a periodic domain. The measures are obtained as limits of stochastic viscous perturbations. We prove that the span of the H1 eigenfunctions of the transport operator contains the support of these measures, and apply the result to a number of examples in which explicit computations are possible (relaxation enhancing, shear, cellular flows). In the case of shear flows, anomalous scalings can be handled in view of a precise quantification of the enhanced dissipation effects due to the flow.
February 3 (Friday). Special Applied
Math/Statistics/Stochastics Seminar. Note Time is 3pm - 4pm and Room
is LCB 219.
Speaker: Dan Shen, Department of Mathematics and Statistics, University of South Florida
Title: PCA Asymptotics & Analysis of Tree Data
Abstract: A general asymptotic framework is developed for studying consistency properties of principal component analysis (PCA). Our framework includes several previously studied domains of asymptotics as special cases and allows one to investigate interesting connections and transitions among the various domains. More importantly, it enables us to investigate asymptotic scenarios that have not been considered before, and gain new insights into the consistency, subspace consistency and strong inconsistency regions of PCA and the boundaries among them. In addition, we studied the asymptotic properties of these sparse PC directions for scenarios with fixed sample size and increasing dimension (i.e. High Dimension, Low Sample Size (HDLSS)). Second we develop statistical methods for analyzing tree-structured data objects. This work is motivated by the statistical challenges of analyzing a set of blood artery trees, which is from a study of Magnetic Resonance Angiography (MRA) brain images of a set of 98 human subjects. The non-Euclidean property of tree space makes the application of conventional statistical analysis, including PCA, to tree data very challenging. We develop an entirely new approach that uses the Dyck path representation, which builds a bridge between the tree space (a nonEuclidean space) and curve space (standard Euclidean space). That bridge enables the exploitation of the power of functional data analysis to explore statistical properties of tree data sets.
February 24 (Friday). LCB 222, 4:15pm - 5:30pm.
Speaker: Gunilla Kreiss, Department of Information Technology, Uppsala University
Title: Error analysis for finite difference methods: What is the relation between the truncation error in a single point, and the global error?
Abstract: In many high order accurate finite difference methods for partial differential equations cases the local truncation error is significantly larger at a few points near boundaries than at interior points. The effect can be analyzed by Laplace transform techniques. In this talk we shall discuss how results from one space dimension can be extended to higher space dimensions. We will in particular consider the second order wave equation.
Speaker: Graeme Milton, Department of Mathematics, University of Utah
Title: On the elastic moduli of 3-d printed materials.
Abstract: 3-d printing gives us unprecedented ability to tailor microstructures to achieve desired goals. From the mechanics perspective one would like, for example, to know how to design structures that guide stress, in the same way that conducting fibers are good for guiding current. In that context the natural question is: what are the possible pairs of (average stress, average strain) that can exist in the material. A more grand question is: what are the possible effective elasticity tensors that can be achieved by structuring a material with known moduli. This is a highly non-trivial problem: in 3-dimensions elasticity tensors have 18 invariants and even an object as simple as a distorted hypercube in 18 dimensions requires about 4.7 million numbers to specify it. Here we review some of the progress that has been made on this question.
This is joint work with Marc Briane and Davit Harutyunyan.
Speaker: Saverio Spagnolie, Department of Mathematics, University of Wisconsin-Madison
Title: The sedimentation of flexible filaments
Abstract: The deformation and transport of elastic filaments in viscous fluids play central roles in many biological and technological processes. Compared with the well-studied case of sedimenting rigid rods, the introduction of filament compliance may cause a significant alteration in the long-time sedimentation orientation and filament geometry. In the weakly flexible regime, a multiple-scale asymptotic expansion is used to obtain expressions for filament translations, rotations and shapes which match excellently with full numerical simulations. In the highly flexible regime we show that a filament sedimenting along its long axis is susceptible to a buckling instability. Incorporating the dynamics of a single filament into a mean-field theory, we show how flexibility affects a well established concentration instability in a sedimenting suspension. Related aspects of boundary integral equations, boundary effects, and viscous erosion will also be touched upon.
March 22 (Wednesday).
Note Time, Wednesday 1pm - 2pm and Place JFB B-1.
Speaker: Nick Trefethen, Department of Mathematics, University of Oxford
Title: CUBATURE, APPROXIMATION, AND ISOTROPY IN THE HYPERCUBE
Abstract: The hypercube is the standard domain for computation in higher dimensions. We explore two respects in which the anisotropy of this domain has practical consequences. The first is the matter of axis-alignment in low-rank compression of multivariate functions. Rotating a function by a few degrees in two or more dimensions may change its numerical rank completely. The second concerns algorithms based on approximation by multivariate polynomials, an idea introduced by James Clerk Maxwell. Polynomials defined by the usual notion of total degree are isotropic, but in high dimensions, the hypercube is exponentially far from isotropic. Instead one should work with polynomials of a given "Euclidean degree". The talk will include numerical illustrations, a theorem based on several complex variables, and a discussion of "Padua points".
March 24 (Friday).
Note Time, Friday 2pm - 2:30pm and Place JWB 333.
Speaker: Ross McPhedran, School of Physics, University of Sydney
Title: Macdonald's Theorem for Analytic Functions
Abstract: This informal talk is about a theorem related to analytic functions, which I came across in an Obituary of Professor H.M. Macdonald, after whom the Bessel K functions are named. I find the theorem interesting, and am hoping to learn whether it has been forgotten, or is known, possibly under another name. The following is the abstract from a paper recently placed on arxiv (1702.03458). A proof is reconstructed for a useful theorem on the zeros of derivatives of analytic functions due to H. M. Macdonald, which appears to be now little known. The Theorem states that, if a function $f(z)$ is analytic inside a region bounded by a contour on which the modulus of $f(z)$ is constant, then the number of zeros of $f(z)$ and of its derivative in the region differ by unity. The proof is accompanied by Mathematica illustrations.
Speaker: Chrysoula Tsogka, Department of Mathematics, University of Crete
Speaker: Mark Allen, Department of Mathematics, BYU
Speaker: Dmitriy Leykekhman, Department of Mathematics, University of Connecticut
epshteyn (at) math.utah.edu).
Past lectures: Fall 2016, Spring 2016, Fall 2015, Spring 2015, Fall 2014, Spring 2014, Fall 2013, Spring 2013, Fall 2012, Spring 2012, Fall 2011, Spring 2011, Fall 2010, Spring 2010, Fall 2009, Spring 2009, Fall 2008, Spring 2008, Fall 2007, Spring 2007, Fall 2006, Spring 2006, Fall 2005, Spring 2005, Fall 2004, Spring 2004, Fall 2003, Spring 2003, Fall 2002, Spring 2002, Fall 2001, Spring 2001, Fall 2000, Spring 2000, Fall 1999, Spring 1999, Fall 1998, Spring 1998, Winter 1998, Fall 1997, Spring 1997, Winter 1997, Fall 1996, Spring 1996, Winter 1996, Fall 1995.