Archives: 2011 | 2012 | 2013 | 2014 | 2015 | 2016 | 2017 | 2018 | 2019

• Fast randomized iterative numerical linear algebra for quantum chemistry and other applications

  Speaker: Jonathan Weare (New York University) - https://cims.nyu.edu/~weare/
  

  When: Thu, November 1, 2018 - 3:30pm
  Where: John S. Toll Physics Building 1412
  

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  Abstract: I will discuss a family of recently developed stochastic techniques for linear algebra problems involving massive matrices.  These methods can be used to, for example, solve linear systems, estimate eigenvalues/vectors, and apply a matrix exponential to a vector, even in cases where the desired solution vector is too large to store.  The first incarnations of this idea appear for dominant eigenproblems arising in statistical physics and in quantum chemistry and were inspired by the real space diffusion Monte Carlo algorithm which has been used to compute chemical ground states for small systems since the 1970's.  I will discuss our own general framework for fast randomized iterative linear algebra as well share a (very partial) explanation for their effectiveness.  I will also report on the progress of an ongoing collaboration aimed at developing fast randomized iterative schemes specifically for applications in quantum chemistry.  This talk is based on joint work with Lek-Heng Lim, Timothy Berkelbach, and Sam Greene.
  
  
• Mori-Zwanzig formalism and discrete-time modeling of chaotic dynamics

  Speaker: Kevin Lin (University of Arizona) - http://math.arizona.edu/~klin/index.php
  

  When: Thu, November 8, 2018 - 3:30pm
  Where: Kirwan Hall 3206
  

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  Abstract: Nonlinear dynamic phenomena often require a large number of
  dynamical variables to model, only a small fraction of which
  are of direct interest. Reduced models that use only the
  relevant dynamical variables can be very useful in such
  situations, both for computational efficiency and insights
  into the dynamics. Recent work has shown that the NARMAX
  (Nonlinear Auto-Regressive Moving-Average with eXogenous
  inputs) representation of stochastic processes provides an
  effective basis for parametric model reduction in a number
  of concrete settings [Chorin-Lu PNAS 2015]. In this talk, I
  will review these developments as well as a general
  theoretical framework for model reduction due to Mori and
  Zwanzig. I will then explain how the NARMAX method can be
  seen as a special case of the Mori-Zwanzig formalism, and
  discuss some general implications and technical issues that
  arise. These ideas will be illustrated on a prototypical
  model of spatiotemporal chaos.
  
  
• Efficient Analytical and Numerical Treatment of High Contrast Composites

  Speaker: Yulia Gorb (University of Houston) - https://www.math.uh.edu/~gorb/about.html
  

  When: Tue, February 5, 2019 - 3:30pm
  Where: Kirwan Hall 3206
  

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  Abstract: This talk reviews numerical and asymptotic analysis methods for models that describe heterogeneous or composite materials. In particular, we focus on high contrast two-phase dispersed composites that are described by PDEs with rough coefficients, e.g. the case of highly conducting particles that are distributed in the matrix of finite conductivity. In our numerical studies, we assume that particles are located at distances comparable with their sizes, while in our asymptotic methods, we consider densely packed composites where particles are almost touching one another. The proposed numerical procedure yields robust iterative methods whose numbers of iterations are independent of the contrast parameter and the discretization scale. Discrete models constructed using our asymptotic procedures are used for capturing and characterizing of various blow-up phenomena that occur in dense high contrast materials.
  
  
• Rigidity and flexibility of isometric embeddings

  Speaker: Camillo De Lellis (Institute for Advanced Studies Princeton) -
  

  When: Thu, February 7, 2019 - 3:30pm
  Where: Kirwan Hall 3206
  

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  Abstract: Consider a smooth connected closed two-dimensional Riemannian manifold Σ with positive Gauss curvature. If u is a C^2 isometric embedding of Σ, then u(Σ) is convex. On the other hand, in the fifties Nash and Kuiper showed, astonishingly, that this conclusion is in general false for C^1 isometric embeddings. It is expected that the threshold at which isometric embeddings “change nature” is the 1/2-Hoelder continuity of their derivatives, a conjecture which shares a striking similarity with another famous one in the theory of fully developed turbulence.
  In my talk I will review several plausible reasons for the threshold and a very recent work, joint with Dominik Inauen, which indeed shows a suitably weakened form of the conjecture.
  
• Speeds and Homogenization for Fisher-KPP Reaction-Diffusion Equations in Random Media

  Speaker: Jessica Lin (McGill University) -
  

  When: Thu, March 7, 2019 - 3:30pm
  Where: Kirwan Hall 3206
  

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  Abstract: The study of spreading speeds, front speeds, and homogenization for Fisher-KPP reaction-diffusion equations in random heterogeneous media is of interest for many applications to mathematical modelling. However, all pre-existing approaches rely upon linearizing the reaction term. In this talk, we will discuss a new approach to such problems which does not utilize linearization. This talk is based on joint work with Andrej Zlatos
  
• Long time dynamics for nonlinear Schrodinger equations at critical regularity

  Speaker: Zehua Zhao (John Hopkins University) - http://www.math.jhu.edu/~zzhao25/
  

  When: Thu, April 4, 2019 - 3:30pm
  Where: Kirwan Hall 3206
  

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  Abstract: In this talk, we will talk about the long time dynamics for critical nonlinear Schrodinger equations (NLS). First, we will introduce the background, some important results and some famous conjectures in this area. Moreover, two specific results of the speaker will be addressed, i.e. ``Scattering for the high dimensional inter-critical NLS'' (joint with C. Gao) and ``Dynamics of subcritical threshold solutions for energy-critical NLS'' (joint with Q. Su).
  
  
• A non-local one-phase free boundary problem, from obstacle to cavitation

  Speaker: Yiling Wu (UT Austin) -
  

  When: Thu, April 11, 2019 - 3:30pm
  Where: Kirwan Hall 3206
  

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  Abstract: Properties of a non-local free boundary problem which is an intermediate case of thin obstacle problem and fractional cavitation problem will be discussed. First there will be a general introduction to free boundary problems including the local and non-local obstacle and cavitation problems. Then I will prove in the non-local intermediate case, the blow-up profiles are homogeneous by a Weiss type monotonicity formula,  and the flatness condition of the free boundary of the viscosity solutions implies C^{1,\theta} regularity.
  
• Latent factor models (continued)

  Speaker: David Bindel (Cornel University) - http://www.cs.cornell.edu/~bindel/
  

  When: Thu, April 18, 2019 - 3:30pm
  Where: Kirwan Hall 3206
  

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  Abstract: Approximate low-rank factorizations pervade matrix data analysis, often interpreted in terms of latent factor
  models. After discussing the ubiquitous singular value decomposition (aka PCA), we turn to factorizations
  such as the interpolative decomposition and the CUR factorization that offer advantages in terms of inter-
  pretability and ease of computation. We then discuss constrained approximate factorizations, particularly
  non-negative matrix factorizations and topic models, which are often particularly useful for decomposing
  data into sparse parts. Unfortunately, these decompositions may be very expensive to compute, at least in
  principal. But in many practical applications one can make a separability assumption that allows for rela-
  tively inexpensive algorithms. In particular, we show how to the separability assumption enables efficient
  linear-algebra-based algorithms for topic modeling, and how linear algebraic preprocessing can be used to
  “clean up” the data and improve the quality of the resulting topics.
  
  
• Scalable kernel methods (continued)

  Speaker: David Bindel (Cornell University) - http://www.cs.cornell.edu/~bindel/
  

  When: Thu, April 25, 2019 - 3:30pm
  Where: Kirwan Hall 3206
  

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  Abstract: Kernel methods are used throughout statistical modeling, data science, and approximation theory. Depend-
  ing on the community, they may be introduced in many different ways: through dot products of feature
  maps, through data-adapted basis functions in an interpolation space, through the natural structure of a
  reproducing kernel Hilbert space, or through the covariance structure of a Gaussian process. We describe
  these various interpretations and their relation to each other, and then turn to the key computational bot-
  tleneck for all kernel methods: the solution of linear systems and the computation of (log) determinants for
  dense matrices whose size scales with the number of examples. Recent developments in linear algebra make
  it increasingly feasible to solve these problems efficiently even with millions of data points. We discuss some
  of these techniques, including rank-structured factorization, structured kernel interpolation, and stochastic
  estimators for determinants and their derivatives. We also give a perspective on some open problems and
  on approaches to addressing the constant challenge posed by the curse of dimensionality.
  
  
• Nonlocal minimal surfaces

  Speaker: Enrico Valdinoci (University of Western Australia) - https://research-repository.uwa.edu.au/en/persons/enrico-valdinoci
  

  When: Thu, May 2, 2019 - 3:30pm
  Where: Kirwan Hall 3206
  

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  Abstract: We discuss some recent results on a geometric problem of nonlocal type, consisting in the minimization of a fractional version of the perimeter. In particular, we will present asymptotics and regularity results, discuss the rather unexpected behavior of the minimizers at the boundary, and some findings in the directions of geometric flows, stressing similarities and differences with respect to the classical case.