Organizers: Patrick Brosnan, Sandra Cerrai, and Vadim Kaloshin
When: 
Wednesday @ 3:15pm, 2:45pm Tea in 3201
Where:
Math 3206
From time to time special colloquia are held on other days, sometimes as part of conferences.
Other special colloquia are the Aziz Lectures and Avron Douglis Memorial Lectures.

  • Held for Department Meeting


    Speaker: Department Meeting (UMD) -

    When: Fri, May 6, 2016 - 3:15pm
    Where: Math 3206
  • Aziz Lecture- TBA


    Speaker: Irene Fonseca (Carnegie Mellon University) - http://www.math.cmu.edu/math/faculty/fonseca

    When: Wed, May 4, 2016 - 3:15pm
    Where: Math 3206
  • Held for Department Meeting


    Speaker: Department Meeting (UMD) -

    When: Fri, April 29, 2016 - 3:15pm
    Where: Math 3206
  • Polterovich ``Billiards with a large Weyl remainder''


    Speaker: Iosif Polterovich (Université de Montréal) - http://www.dms.umontreal.ca/~iossif/

    When: Wed, April 27, 2016 - 3:15pm
    Where: Math3206
  • A sharp counter example to local existence for Einstein equations in wave coordinates


    Speaker: Hans Lindblad (Hopkins) - http://www.math.jhu.edu/~lindblad/

    When: Fri, April 22, 2016 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: We are concerned with how regular initial data have to be to ensure local existence for Einstein's equations in wave coordinates. Klainerman-Rodnianski and Smith-Tataru showed that there in general is local existence for data in H^s for s>2. We give example of data in H^2 for which there is no local solution in H^2. This is joint work with Boris Ettinger.
  • CANCELLED! (Interpretations of Probability)


    Speaker: Aidan Lyon (UMCP Philosophy) - http://aidanlyon.com/

    When: Wed, April 20, 2016 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: The concept of probability plays a crucial role in every branch of science and everyday life. Indeed, probability is so important to all of humanity's endeavors that Bishop Butler once said that "probability is the very guide to life" and Henri Poincaré once wrote that “if [the probability] calculus be condemned, then the whole of the sciences must also be condemned”. However, despite the ubiquity and importance of the concept of probability, it is surprisingly difficult to say what statements of probability mean. What do we mean when we say something has a particular probability? To answer this question is to give an interpretation of probability. In this talk, I will give a critical overview of the leading interpretations of probability: the classical, logical, frequentist, propensity, subjective, and best-system interpretations of probability.
  • Smooth surface diffeomorphisms and their invariant probability measures


    Speaker: Jerome Buzzi (Orsay) - http://www.math.u-psud.fr/~buzzi/

    When: Fri, April 15, 2016 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: A classical result of Katok shows that surface
    diffeomorphisms are approximated by horseshoes with respect to
    topological entropy. From a recent result of Hochman, one obtains a
    Borel conjugacy to a Markov shift respecting all invariant ergodic
    probability measures except possibly for measures with zero entropy
    and measures maximizing the entropy at their periods. I will explain
    what joint works with Boyle and with Crovisier and Sarig say (and
    don't say) about these latter measures and present some open
    problems.
  • The Rigorous Derivation of the Focusing NLS from Quantum Many-body Evolution


    Speaker: Xuwen Chen (Brown University) http://www.math.brown.edu/~chenxuwen/

    When: Wed, April 13, 2016 - 3:15pm
    Where: 3206.0

    View Abstract

    Abstract:The rigorous justification of mean-field type equations (Boltzmann, Vlasov-Poisson, NLS...) from the many-body systems they are supposed to describe is a vast and fundamental subject. In this talk, we talk about recent advances in this area on the derivation of focusing nonlinear Schrodinger equations (NLS) from quantum many-body evolutions in the context of Bose-Einstein condensation, which has been one of the most active areas of contemporary research since the Nobel prize winning experiments. We survey the background and the evolution of the results and techniques in the field during the talk.


  • Department Meeting


    Speaker: Department Meeting (UMD) -

    When: Fri, April 8, 2016 - 3:15pm
    Where: Math 3206
  • Artificial Intelligence and data science from Eric Horvitz (Microsoft) and DJ Patil (White House)


    When: Fri, April 8, 2016 - 9:00am
    Where: Time and Place to be determined
  • The static and dynamical Ising and Potts models


    Speaker: Eyal Lubetzky (NYU) - http://cims.nyu.edu/~eyal/

    When: Wed, April 6, 2016 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: The Ising model, one of the most studied models in mathematical physics, was introduced in 1925 to model ferromagnetism. In the classical 2D setting, the model assigns plus/minus spins to the sites of the square grid according to a given probability distribution, which is a function of the number of neighboring sites whose spins agree, as well as the temperature. The Potts model is its generalization into q>2 possible values for each site. Over the last three decades, significant effort has been dedicated to the analysis of stochastic dynamical systems that both model the evolution of the Ising and Potts models, and provide efficient methods for sampling from it. In this talk I will survey the rich interplay between the behaviors of the static and the dynamical models, as they both undergo a phase transition at a critical temperature.
  • Department Meeting


    Speaker: Department Meeting (UMCP) -

    When: Wed, March 30, 2016 - 3:15pm
    Where: Math 3206
  • Hypoelliptic Laplacian and probability


    Speaker: Jean-Michel Bismut (Université Paris-Sud) - http://www.math.u-psud.fr/~bismut/Web_page_of_Jean-MThe hypoelliptic Laplacian is a family of operators, indexed by b in R*_+ ,

    When: Wed, March 9, 2016 - 3:05pm
    Where: 3201.0

    View Abstract

    Abstract: The hypoelliptic Laplacian is a family of operators, indexed by b in R*_+ ,
    acting on the total space of the tangent bundle of a Riemannian manifold, that
    interpolates between the ordinary Laplacian as b tends to 0 and the generator of the
    geodesic ow as b tends to infinity . The probabilistic counterpart to the hypoelliptic
    Laplacian is a 1-parameter family of dierential equations, known as geometric
    Langevin equations, that interpolates between Brownian motion and the geodesic
    I will present some of the probabilistic ideas that explain some of its remarkable
    and often hidden properties. I will also explain some of the applications of
    the hypoelliptic Laplacian that have been obtained so far.
  • Asymptotic limits for collisional kinetic equations


    Speaker: Marjolaine Puel (Université de Nice-Sophia-Antipolis) - http://math.unice.fr/laboratoire/equipes-de-recherche/edp-et-analyse-num%C3%A9rique

    When: Mon, March 7, 2016 - 11:00am
    Where: Math 3206

    View Abstract

    Abstract: In several domain of applied math as nuclear industry, aerodynamic, biology, gas dynamics may be modeled by some kinetic equations. Their structure is complex and a real challenge consists in providing simpler models that are more performant for numerics.
    We first try to explain how kinetic equations may be linked to particle trajectories and introduce two particular cases, the Boltzmann equation and the Fokker Planck equation. Then we will give the context in which kinetic equations may be approximated by more macroscopic equations. At the end, we will focus on the diffusion approximation and in particular on the anomalous diffusion approximation for both Boltzmann and Fokker Planck.
  • Combinatorics to Geometry to Arithmetic of Circle Packings


    Speaker: Alex Kontorovich (Rutgers University) - http://www.math.rutgers.edu/~ak1230/index.html

    When: Fri, March 4, 2016 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: The Koebe-Andreev-Thurston/Schramm theorem assigns a
    conformally rigid circle packing to a convex polyhedron; for example,
    the tetrahedron is mapped to the classical Apollonian Circle Packing.
    The latter, an object of much recent study, is "arithmetic", in that
    there are configurations for which all circles have curvatures in the
    rational integers. Our aim, in joint work with Kei Nakamura, is to
    classify polyhedra with this property. We will start from scratch and
    report on work in progress towards this goal.
  • Discussion with EPSL Head Librarian


    Speaker: Nevenka Zdravkovska (UMCP Libraries) - http://www.lib.umd.edu/epsl/contact-epsl/profile_zdravkovska

    When: Wed, March 2, 2016 - 3:15pm
    Where: Math 3206
  • Arithmetic properties of function fields of p-adic curves


    Speaker: R. Parimala (Emory ) - http://www.mathcs.emory.edu/~parimala/

    When: Fri, February 26, 2016 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: Classical theorems over number fields like the Hasse-Minkowski theorem
    on local-global principles for zeros of quadratic forms have
    surprising analogues over function fields of p-adic curves. We will
    expand on some results in this direction and also discuss several open
    questions concerning homogeneous spaces under connected linear
    algebraic groups over such fields.
  • Global controllability to trajectories for the viscous Burgers equation


    Speaker: Armen Shirikyan (Université de Cergy-Pontoise ) - http://shirikyan.u-cergy.fr

    When: Wed, February 24, 2016 - 3:15pm
    Where: 3206.0

    View Abstract

    Abstract: We study the problem of global controllability by an external force for the viscous Burgers equation on a bounded interval. Assuming that the force is localised in space, we prove that any non-stationary trajectory can be exponentially stabilised. We next discuss various consequences of this result, including global exact controllability to trajectories and approximate controllability by a localised low-dimensional control.
  • Geometric graph-based methods for high dimensional data


    Speaker: Andrea Bertozzi (UCLA) - http://www.februaryfouriertalks.com

    When: Fri, February 19, 2016 - 3:15pm
    Where: MTH 3206

    View Abstract

    Abstract: Special Department Colloquium part of the 2016 February Fourier Talks.

    Registration and full schedule of talks at www.februaryfouriertalks.com

    Abstract:
    We present new methods for segmentation of large datasets with graph based structure. The method combines ideas from classical nonlinear PDE-based image segmentation with fast and accessible linear algebra methods for computing information about the spectrum of the graph Laplacian. The goal of the algorithms is to solve semi-supervised and unsupervised graph cut optimization problems. I will present results for image processing applications such as image labeling and hyperspectral video segmentation, and results from machine learning and community detection in social networks, including modularity optimization posed as a graph total variation minimization problem.
  • Singularity formation in nonlinear PDE’s: a qualitative approach


    Speaker: Pierre Raphael (U. Nice Sophia Antipolis) - http://math.unice.fr/~praphael/

    When: Wed, February 17, 2016 - 11:00am
    Where: Math 3206

    View Abstract

    Abstract: The qualitative study of nonlinear partial differential equations has made spectacular progress in the past 30 years. Various deep nonlinear phenomenons have now been exhibited, at least on some canonical simplified models extracted from physics. I shall report in this talk onto one specific phenomenon: singularity formation, and more generally energy concentration. I will illustrate on some canonical models (like the seminlinear heat or Schrodinger equation) how one can construct and completely understand some scenarios of energy concentration, and how a complete classification of such blow up dynamics can sometimes be obtained. At the heart of the analysis lies a fundamental nonlinear object: the solitary wave.
  • Equidistribution of Frobenius eigenvalues


    Speaker: Kiran Kedlaya (UCSD) -

    When: Fri, February 12, 2016 - 3:15pm
    Where: 3206.0

    View Abstract

    Abstract: Consider a system of polynomial equations with integer coefficients. For
    each prime number p, one can count the solutions of these equtaions in
    the integers modulo p; while the structure of these counts is a rather
    deep topic in number theory, one can pose statistical questions about
    these counts for which the answers are expected to be somewhat simpler
    (although still deep). We discuss several variations on this theme,
    including the Chebotarev density theorem, the Sato-Tate conjecture for
    elliptic curves, a general but imprecise conjecture of Serre, and a
    precise form of Serre's conjecture for genus 2 curves due to
    Fite-Kedlaya-Rotger-Sutherland.

  • p-adic uniformization of Shimura curves


    Speaker: Michael Rapoport (Universitaet Bonn ) - http://www.math.uni-bonn.de/ag/alggeom/rapoport

    When: Wed, February 10, 2016 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: Shimura curves are algebraic curves that arise through complex
    uniformization by an arithmetic group acting on the complex half
    plane. Forty years ago, Cherednik observed that under suitable
    assumptions, these curves can also be uniformized by the Drinfeld
    p-adic half plane. Now we are close to a reasonable proof (of a
    variant) of this statement.
    I will report on joint work with S. Kudla and Th. Zink, and related
    work of P. Scholze.
  • ENIGMA: Harnessing mathematics in cryptology


    Speaker: Roman Sznajder (Bowie State University) - http://www.bowiestate.edu/academics-research/faculty-staff-directory/details/sznajder/

    When: Fri, January 29, 2016 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: ENIGMA was a German ciphering machine developed soon after WWI for commercial use. Shortly after, it was acquired by the German army and used for encrypting and decrypting military messages and orders. We discuss the circumstances that led to the initial breaking of the Enigma code in 1932 by three young cryptologists: Rejewski, Różycki, and Zygalski from the Polish Cipher Office. This was the first time when mathematics was systematically used in cryptography. Specifically, there were applications of permutation groups used to reconstruct the wiring of military Enigma and then to recover the daily keys and keys for individual messages. In the summer of 1939, when the outbreak of WWII was imminent, the Polish Cipher Office provided Allies with two copies of the Enigma machine and daily keys. Aided by these materials, the British immediately began working on breaking Enigma messages. Their office in Bletchley Park had access to human, engineering, and technological resources on an industrial scale. The ability to read encrypted messages used by the German army—enabled by the breaking of the Enigma code—contributed to the shortening of WWII and, according to some estimates, spared several million lives. With the British WWII archives sealed and Poland behind the Iron Curtain, the British Secret Service suppressed the knowledge about the role of Polish intelligence in breaking the Enigma code for about thirty years. The heroic effort of three Polish cryptologists was virtually unknown to the world until the 1973 publication of a book by the French general Gustave Bertrand. In this presentation, we will shed some light on mathematical methods, the events and people involved in the successful effort to break the Enigma code.
  • A drunk walk in a drunk world


    Speaker: Ivan Corwin (Columbia University, Clay Mathematics Institute) - http://www.math.columbia.edu/~corwin/

    When: Wed, December 9, 2015 - 3:15pm
    Where: Math3206

    View Abstract

    Abstract: In a simple symmetric random walk on Z a particle jumps left or right with 50% chance independently at each time and space location. What if the jump probabilities are taken to be random themselves (e.g. uniformly distributed between 0% and 100%). In this talk we will describe the effect of this random environment on a random walk, in particular focusing on a new connection to the Kardar-Parisi-Zhang universality class and to the theory of quantum integrable systems. No prior knowledge or background will be expected.
  • Tensor Sparsity - a Regularity Notion for High Dimensional PDEs [Aziz Lecture]


    Speaker: Wolfgang Dahmen (Aachen University, Germany) - https://www.igpm.rwth-aachen.de/personen/dahmen

    When: Wed, November 18, 2015 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: The numerical solution of PDEs in a spatially high-dimensional regime (such as the electronic Schrodinger or Fokker-Planck
    equations) is severely hampered by the "curse of dimensionality":
    the computational cost required for achieving a desired target accuracy increases exponentially with respect to the spatial dimension.

    We explore a possible remedy by exploiting a typically hidden sparsity of the solution to such problems with respect to a problem dependent basis or dictionary. Here sparsity means that relatively few terms from such a dictionary suffice to realize a given target accuracy. Specifically, sparsity with respect to dictionaries comprised of separable functions -- rank-one tensors
    -- would significantly mitigate the curse of dimensionality. The main result establishes such tensor-sparsity for elliptic problems over product domains when the data are tensor-sparse, which can be viewed as a structural regularity theorem.

  • Geometry of ODE's with a small parameter


    Speaker: Dima Arinkin (University of Wisconsin) - http://www.math.wisc.edu/~arinkin/

    When: Wed, November 11, 2015 - 3:15pm
    Where: 3206.0

    View Abstract

    Abstract: I will look at very classical objects (linear ordinary differential equations) and study them from the view-point of algebraic geometry. The starting point is some simple results about differential operators of the form h(d/dx)+A(x), where h is small. The results lead to a non-trivial and beautiful picture for the parameter space of such equations, which may be interpreted geometrically as the moduli space of bundles with connections on a Riemann surface.
  • John Horvath remembrance event


    Speaker: Hold Date () -

    When: Wed, November 4, 2015 - 3:15pm
    Where: Math 3206
  • No Colloquium


    Speaker: No Colloquium () -

    When: Fri, October 30, 2015 - 3:15pm
    Where: Math 3206
  • No Seminar


    Speaker: No Seminar () -

    When: Wed, October 28, 2015 - 3:15pm
    Where: Math 3206
  • No Seminar


    Speaker: No Seminar () -

    When: Wed, October 21, 2015 - 3:15pm
    Where: Math 3206
  • Milnor-Witt K-Theory


    Speaker: Stefan Gille (Alberta) -

    When: Wed, October 14, 2015 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: Milnor-Witt K-theory arises in the Morel-Voevodsky homotopy theory over a field and plays a role in the classification of vector bundles over smooth schemes. Morel in collaboration with Hopkins discovered a nice presentation of these groups, which has been recently generalized by Changlong Zhong, Stephen Scully and myself to semilocal rings which contain an infinite field. In my talk I will discuss this result and also present some applications of these groups.
  • Colloquium supeseded by Math Department Welcome


    Speaker: Math Department Welcome () -

    When: Fri, September 25, 2015 - 3:15pm
    Where: Math 3206
  • Galileo's New Mathematics


    Speaker: Mark A. Peterson (Mount Holyoke College) - https://www.mtholyoke.edu/acad/facultyprofiles/mark_peterson

    When: Wed, September 16, 2015 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: Galileo isn't really remembered for his mathematics.
    There is nothing called "Galileo's Theorem," for instance.
    But Galileo did make a fundamental contribution to mathematics,
    arguably more important than any new theorem, namely a new (or re-discovered)
    conception of what mathematics could mean. In the decades before
    Galileo, higher mathematics was an essentially static and obscure
    corner of philosophy, barely connected to physical reality.
    After Galileo, mathematics became the scaffolding
    of physics, and (apparently as a consequence) subject to rapid development.
    This revolution in Galileo's thought, and in the philosophy of
    mathematics more generally, had to come from outside mathematics:
    in Galileo's case it had its roots in literature, the arts, and quite
    possibly the theology of the High Middle Ages.
  • Hodge Theory on Matroids


    Speaker: Eric Katz (Univerisity of Waterloo) - http://www.math.uwaterloo.ca/~eekatz/

    When: Wed, September 9, 2015 - 3:15pm
    Where: Math 3206

    View Abstract

    Abstract: The chromatic polynomial of a graph counts its proper colourings. This polynomial's coefficients were conjectured to form a unimodal sequence by Read in 1968. This conjecture was extended by Rota in his 1970 address to assert the log-concavity of the characteristic polynomial of matroids which are the common generalizations of graphs and linear subspaces. We discuss the resolution of this conjecture which is joint work with Karim Adiprasito and June Huh. The solution draws on ideas from the theory of algebraic varieties, specifically Hodge theory, showing how a question about graph theory leads to a solution involving Grothendieck's standard conjectures.