Organizers: Wujun Zhang, Ricardo Nochetto, Howard Elman
When: Tuesdays @ 3:30pm
Where: Math 3206
Pre-2012 Archives: Additional Information and Archives

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

  • Adaptive approximation of the Monge-Kantorovich problem

    Speaker: Prof. Soeren Bartels (Department of Mathematics, University of Freiburg, Germany) - http://aam.uni-freiburg.de/abtlg-en/ls/lsbartels/FrontPage?set_language=en

    When: Tue, August 2, 2016 - 3:30pm
    Where: Kirwan Hall 1311

    View Abstract

    Abstract: Optimal transportation problems define high-dimensional linear
    programs. An efficient approach to their numerical solution is
    based on reformulations as nonlinear partial differential
    equations. If transportation cost is proportional to distance
    this leads to the Monge--Kantorovich problem which is a
    constrained minimization problem on Lipschitz continuous
    functions. We discuss the iterative solution via splitting
    methods and devise an adaptive mesh refinement strategy based on
    an a~posteriori error estimate for the primal-dual gap. This is
    joint work with Patrick Schoen (University of Freiburg).
  • Solutions of Non-Linear Differential Equations with Feature Detection Using Fast Walsh Transforms

    Speaker: Peter Gnoffo (NASA Langley Research Center) -

    When: Tue, September 6, 2016 - 3:30pm
    Where: AV Williams 3258

    View Abstract

    Abstract: Walsh functions form an orthonormal basis set consisting of square waves. Square waves make the system well suited for detecting and representing functions with discontinuities. Given a uniform distribution of 2 cells on a one-dimensional element, it is proved that the inner product of the Walsh Root function for group p with every polynomial of degree < (p - 1) across the element is identically zero. It is also proved that the magnitude and location of a discontinuous jump, as represented by a Heaviside function, are explicitly identified by its Fast Walsh Transform (FWT) coefficients. These two proofs enable an algorithm that quickly provides a Weighted Least Squares fit to distributions across the element that include a discontinuity. It is shown that flux reconstruction relative to the FWT fit in partial differential equations provides improved accuracy and eliminates the need for flux limiting in the vicinity of a discontinuity. The detection of a discontinuity further enables analytic relations to locally describe its evolution and provide increased accuracy. Examples are provided for time-accurate advection, Burgers equation, and quasi-one-dimensional nozzle flow.

  • ShapeFit and ShapeKick for Robust, Scalable Structure from Motion

    Speaker: Paul Hand (Department of Computational and Applied Mathematics, Rice University) - http://www.caam.rice.edu/~hand/

    When: Wed, September 14, 2016 - 3:30pm
    Where: AV Williams 3258

    View Abstract

    Abstract: We consider the problem of recovering a set of locations given observations of the direction between pairs of these locations. This recovery task arises from the Structure from Motion problem, in which a three-dimensional structure is sought from a collection of two-dimensional images. In this context, the locations of cameras and structure points are to be found from Epipolar geometry and point correspondences among images. These correspondences are often incorrect because of lighting, shadows, and the effects of perspective. Hence, the resulting observations of relative directions contain significant outliers. We introduce a new method for outlier-tolerant location recovery from pairwise directions. This method, called ShapeFit, is a convex Second Order Cone Program that can be efficiently solved. Empirically, ShapeFit can succeed on synthetic data with over 50% corruption. Rigorously, we prove that ShapeFit can recover a set of locations exactly when a fraction of the measurements are adversarially corrupted and when the data model is random. On real data, an ADMM implementation of ShapeFit yields performance comparable to the state-of-the-art with an order of magnitude speed-up. Our proposed numerical framework is flexible in that it accommodates other approaches to location recovery and can be used to speed up other methods. These properties are demonstrated by extensively testing against state-of-the-art methods for location recovery on 13 large, irregular collections of images of real scenes.

  • Scalable methods for machine learning and sparse signal recovery

    Speaker: Tom Goldstein (University of Maryland, Department of Computer Science) - https://www.cs.umd.edu/~tomg/

    When: Wed, October 5, 2016 - 2:00pm
    Where: 4122 CSIC

    View Abstract

    Abstract: However, these resources present a host of new algorithmic challenges. Practical algorithms for large-scale data analysis must scale well across many machines, have low communication requirements, and have low (nearly linear) runtime complexity to handle extremely large problems.

    In this talk, we discuss alternating direction methods as a practical and general tool for solving a wide range of model-fitting problems in a distributed framework. We then focus on new "transpose reduction" strategies that allow extremely large regression problems to be solved quickly on a single node. We will study the performance of these algorithms for fitting linear classifiers and sparse regression models on tera-scale datasets using thousands of cores.
  • Algorithms for Flow Ensembles

    Speaker: Bill Layton (University of Pittsburgh) - http://www.math.pitt.edu/~wjl/

    When: Tue, October 18, 2016 - 3:30pm
    Where: 3258 AV Williams

    View Abstract

    Abstract: It is long known that assessing the reliability and improving the accuracy of fluid flow simulations requires computing ensembles. However, the Navier-Stokes equations are sensitive to mesh resolution: simulations can be plausible but wrong for under resolved meshes. These two issues introduce the inevitable competition in memory, time and other resources of resolution vs. ensemble computations. This talk will present some first steps in resolving this competition. Interestingly, new algorithms mean new turbulence models are possible. This work is joint with Nan Jiang, Missouri Univ. Science and Technology.
  • Monotone numerical methods for nonlinear parabolic and integro-parabolic problems

    Speaker: Igor Boglaev (Massey University, University of New Zealand) - http://www.massey.ac.nz/massey/learning/colleges/college-of-sciences/about/fundamental-sciences/staff-list.cfm?stref=754330

    When: Tue, October 25, 2016 - 3:30pm
    Where: 3258 AV Williams

    View Abstract

    Abstract: The talk is concerned with monotone numerical methods for nonlinear
    parabolic and integro-parabolic problems. The basic idea of the iterative
    methods for the computation of numerical solutions is the monotone ap-
    proach which involves the notion of upper and lower solutions and the con-
    struction of monotone sequences from a suitable linear discrete system.

    The monotone property of the iterations gives improved upper and lower
    bounds of the solution in each iteration. Error estimates between the com-
    puted approximations and the solutions of the nonlinear discrete problems
    are obtained for each monotone iterative method. The monotone conver-
    gence property is used to prove the convergence of the nonlinear discrete
    problems to the corresponding differential problems as mesh sizes decrease
    to zero.

    Applications are given to several models arising from physical, chemical
    and biological systems. Numerical experiments are given to some of these
    models, including a discussion on a rate of convergence of the monotone
    sequences.
  • Mixed-Integer PDE-Constrained Optimization

    Speaker: Sven Leyffer (Argonne National Laboratory), https://wiki.mcs.anl.gov/leyffer/index.php/Sven_Leyffer

    When: Tue, November 1, 2016 - 3:30pm
    Where: 3258 AV Williams

    View Abstract

    Abstract: Many complex applications can be formulated as optimization problems constrained bypartial differential equations (PDEs) with integer decision variables. Examples include the remediation of contaminated sites and the maximization of oil recovery; the design of next generation solar cells; the layout design of wind-farms; the
    design and control of gas networks; disaster recovery; and topology optimization.

    We will present emerging applications of mixed-integer PDE-constrained optimization,
    review existing approaches to solve these problems, and highlight their computational and
    mathematical challenges. We introduce a new set of benchmark set for this challenging
    class of problems, and present some early numerical experience using both mixed-integer
    nonlinear solvers and heuristic techniques.
  • Finding Low-Rank Solutions via the Burer-Monteiro Approach, Efficiently and Provably

    Speaker: Anastasios Kyrillidis, University of Texas, http://akyrillidis.github.io/about/

    When: Tue, November 8, 2016 - 3:30pm
    Where: 3258 AV Williams

    View Abstract

    Abstract: A low rank matrix can be described as the outer product of two tall matrices, where the total number of variables is much smaller. One could exploit this observation in optimization: e.g., consider the minimization of a convex function f over low-rank matrices, where the low-rank set is modeled via such factorization. This is not the first time such a heuristic has been used in practice. The reasons of this choice could be three-fold: (i) it might model better an underlying task (e.g., f may have arisen from a relaxation of a rank constraint in the first place), (ii) it might lead to computational gains, since smaller rank means fewer variables to maintain and optimize, (iii) it leads to statistical gains, as it might prevent over-fitting in machine learning or inference problems.

    Though, such parameterization comes at a cost: the objective is now a bilinear function over the variables, and thus non-convex with respect to the factors. Such cases are known to be much harder to analyze. In this talk, we will discuss and address some of the issues raised by working directly on such parameterization: How does the geometry of the problem change after this transformation? What can we say about global/local minima? Does this parameterization introduce spurious local minima? Does initialization over the factors play a key role, and how we can initialize in practice? Can we claim any convergence guarantees under mild assumptions on the objective f? And if yes, at what rate?
  • Modern Multiscale Methods for First-Principles Collisionless Plasma Simulation

    Speaker: Luis Chacon (Los Alamos National Laboratory) - http://www.lanl.gov/expertise/profiles/view/luis-chacon

    When: Tue, November 15, 2016 - 3:30pm
    Where: 3258 AV Williams

    View Abstract

    Abstract: Collisionless plasmas are described by the Vlasov-Maxwell equations. This set of equations is high-dimensional (spanning three spatial and three velocity dimensions), highly nonlinear, and remarkably multi-scale, supporting disparate time and length scales. These features make its efficient numerical integration extremely challenging. The high-dimensionality of these equations have made particle methods quite attractive. In the plasma context, the method is termed particle-in-cell (PIC). PIC is naturally adaptive in velocity space, and resolves the curse of dimensionality by allowing the estimation of moment integrals be independent of the dimensionality of the underlying phase space. However, PIC can be noisy, and is generally problematic for long-term integrations of
    the Vlasov-Maxwell equations due to both accuracy limitations (e.g., lack of energy conservation results in secular energy growth which subtracts fidelity from the simulation) and efficiency ones (particle methods are typically explicit, and feature both temporal and spatial stability constraints that force the resolution of both the fastest frequencies and the smallest length-scales supported by the model). These limitations make the long-term,
    system-scale PIC simulation of physical systems intractable, even with the most powerful supercomputers.

    Recently, fully implicit, nonlinear algorithms have been proposed for both electrostatic [1,2] and electromagnetic [3,4,5] PIC descriptions that enable for the first time truly multiscale kinetic simulations of collisionless plasmas with particle methods. These algorithms 1) feature exact conservation properties, thus avoiding secular growth of
    conserved quantities, and 2) eliminate the numerical stability constraints of explicit PIC, thus allowing the use of large time steps and mesh sizes (compatible with the physics of interest). The approaches, based on modern nonlinear iterative methods, minimize the solver memory footprint by nonlinearly enslaving the kinetic component (particles) to the field equations. Thus, only field equations appear explicitly in the nonlinear residual, resulting in only modest memory requirements for the nonlinear solver. Only a single copy of the particles is needed, as with explicit implementations.

    However, despite drastically decreasing the number of degrees of freedom (by allowing larger mesh cells) and the number of time steps required for a given simulation (by allowing large time steps), the resulting algebraic system remains extremely ill-conditioned and requires effective preconditioning for efficiency. A powerful advantage of nonlinear kinetic enslavement is that one can explore moment-based preconditioners. In this talk,
    we will introduce the fully implicit, conservative multidimensional PIC method, and our approach to fluid preconditioning. We demonstrate the promise of the approach with various challenging numerical examples.

    References:
    [1] G. Chen, L. Chacón, D. C. Barnes, “An energy- and charge-conserving, implicit, electrostatic particle-in-cell algorithm,” J. Comput. Phys., 230, 7018–7036 (2011)
    [2] G. Chen, L. Chacón, C. Leibs, D. A. Knoll, W. Taitano, “Fluid preconditioning for Newton-Krylov-based, fully implicit, electrostatic particle-in-cell simulations”, J. Comput. Phys., 258, p. 555–567 (2014)
    [3] G. Chen, L. Chacón, “An energy- and charge-conserving, nonlinearly implicit, electromagnetic 1D-3V Vlasov–Darwin particle-in-cell algorithm,” Comput. Phys. Commun., 185 (10), 2391-2402 (2014)
    [4] G. Chen, L. Chacón, “An energy- and charge-conserving, nonlinearly implicit, multidimensional electromagnetic Vlasov–Darwin particle-in-cell algorithm,” Comput. Phys. Commun., 197, 73-87 (2015)
    [5] L. Chacón, G. Chen, “A curvilinear, fully implicit, conservative electromagnetic PIC algorithm in multiple dimensions,” J. Comput. Phys., 316, 578–597 (2016)


  • TBA

    Speaker: Michele Benzi (Emory University) - http://www.mathcs.emory.edu/~benzi/

    When: Tue, November 29, 2016 - 3:30am
    Where: 3258 AV Williams
  • Variable coefficients and numerical methods for electromagnetic waves - Joint Numerical Analysis - CSCAMM Seminar

    Speaker: Dr. Lise-Marie Imbert-Gerard (Courant Institute, NYU) - http://www.cims.nyu.edu/~imbertgerard/index.html

    When: Wed, January 25, 2017 - 2:00pm
    Where: CSIC 4122

    View Abstract

    Abstract: In the first part of the talk, we will discuss a numerical method for wave propagation in inhomogeneous media. The Trefftz method relies on basis functions that are solution of the homogeneous equation. In the case of variable coefficients, basis functions are designed to solve an approximation of the homogeneous equation. The design process yields high order interpolation properties for solutions of the homogeneous equation. This introduces a consistency error, requiring a specific analysis.

    In the second part of the talk, we will discuss a numerical method for elliptic partial differential equations on manifolds. In this framework the geometry of the manifold introduces variable coefficients. Fast, high order, pseudo-spectral algorithms were developed for inverting the Laplace-Beltrami operator and computing the Hodge decomposition of a tangential vector field on closed surfaces of genus one in a three dimensional space. Robust, well-conditioned solvers for the Maxwell equations will rely on these algorithms.
  • Grid-adaptation for large eddy simulations of statistically stationary turbulent flows

    Speaker: Johan Larsson (Department of Mechanical Engineering, University of Maryland) - http://terpconnect.umd.edu/~jola

    When: Tue, February 7, 2017 - 3:30pm
    Where: 3258 AV Williams

    View Abstract

    Abstract: The grid-spacing directly controls both the numerical and the modeling errors in
    coarse-grained simulations of multi-scale problems, one example of which is
    the large eddy simulation (LES) technique for computations of turbulence.
    The modeling errors can not be estimated exactly, and therefore much of the established machinery for grid-adaptation (e.g., truncation errors, how to estimate residuals, etc) becomes less meaningful in this context. The talk will briefly introduce the LES technique and why we are interested in grid-adaptation in this context, and will then describe the development of a directional error estimator capable of driving an anisotropic grid-adaptation process. The talk will then discuss the process of proving grid-convergence in LES and propose a combined verification/adaptation approach that addresses both problems.
    The proposed approach requires the ability to generate grids where the grid-spacing is modified globally by a non-integer factor; one objective of the talk is to seek collaborations in the AMSC community on this specific grid-generation problem.
  • Multilevel Monte Carlo Analysis for Optimal Control of Elliptic PDEs with Random Coefficients

    Speaker: Elisabeth Ullmann (Department of Mathematics, TU Munich) - https://www-m2.ma.tum.de/bin/view/Allgemeines/Ullmann

    When: Tue, February 21, 2017 - 3:30pm
    Where: 3258 AV Williams

    View Abstract

    Abstract: This work is motivated by the need to study the impact of data uncertainties and material imperfections on the solution to optimal control problems constrained by partial differential equations. We consider a pathwise optimal control problem constrained by a diffusion equation with random coefficient together with box constraints for the control. For each realization of the diffusion coefficient we solve an optimal control problem using the variational discretization [M. Hinze, Comput. Optim. Appl., 30 (2005), pp. 45-61]. Our framework allows for lognormal coefficients whose realizations are not uniformly bounded away from zero and infinity.
    We establish finite element error bounds for the pathwise optimal controls. This analysis is nontrivial due to the limited spatial regularity and the lack of uniform ellipticity and boundedness of the diffusion operator. We apply the error bounds to prove convergence of a multilevel Monte Carlo estimator for the expected value of the pathwise optimal controls. In addition we analyze the computational complexity of the multilevel estimator. We perform numerical experiments in 2D space to confirm the convergence result and the complexity bound.