Departmental Colloquium 2012-2013

Thursdays, 4:15 PM, JWB 335

Spring 2013

January 24: SPECIAL COLLOQUIUM
Speaker: Srikanth Iyengar, University of Nebraska, Lincoln
Title: Group algebras and commutative rings
Abstract: The goal of this talk will be to describe a bridge between the modular representation theory of finite groups and modules over polynomial rings. This has given us new insights and results concerning modular representations, and has also lead to unexpected results in commutative algebra. The talk with be based on joint work with Avramov, Benson, Carlson, Buchweitz, Krause, and Claudia Miller.

January 31:
Speaker: Peter Trapa, University of Utah
Title: Unitary representations of reductive Lie groups
Abstract: Unitary representations of Lie groups appear in many places in mathematics: in harmonic analysis (as generalizations of the sines and cosines appearing in classical Fourier analysis); in number theory (as spaces of modular and automorphic forms); in quantum mechanics (as "quantizations" of classical mechanical systems); and in many other places. They have been the subject of intense study for decades, but their classification has only recently recently emerged. Perhaps surprisingly, the classification has inspired connections with interesting geometric objects (equivariant mixed Hodge modules on flag varieties). These connections have made it possible to extend the classification scheme to other related settings.
The purpose of this talk is to explain a little bit about the history and motivation behind the study of unitary representations and offer a few hints about the algebraic and geometric ideas which enter into their study. This is based on a recent preprint with Adams, van Leeuwen, and Vogan.

February 7: SPECIAL COLLOQUIUM
Speaker: Sébastien Motsch, Center for Scientific Computation and Mathematical Modeling, University of Maryland
Title: Mathematical modeling of self-organized dynamics
Abstract: In many biological systems, we observe the emergence of self-organized dynamics (e.g. school of fish, ant colonies, pedestrian traffic). Modeling is an essential tool to better understand their behavior. Based on experimental data, we introduce some recent models which aim to explain such dynamics.
Since biological systems can reach up to millions of individuals, we discuss in a second part how we can derive “macroscopic models” from several microscopic models. In contrast with particle systems in physics, models of self-organized dynamics do not conserve momentum or energy. This lack of conservation requires to introduce new tools to derive and analyze their macroscopic limits.

February 14: SPECIAL COLLOQUIUM
Speaker: Jun Allard, University of California, Davis
Title: Traveling waves in crawling cells
Abstract: Crawling cells, including the white blood cells that patrol your body in search of infections, display several distinct dynamical patterns driven by both biochemistry (diffusion and reactions between chemical species) and mechanics (physical forces between the components inside cells). Our understanding of these spatiotemporal patterns has been aided by mathematical modeling using techniques including partial differential equations (PDEs). Recently, traveling waves have been observed in the protein actin, which powers certain cells’ ability to crawl. Following experimental observation of one type of crawling cell, the fish epithelial keratocyte, we hypothesized that traveling waves are excitable waves arising from interactions of three components: actin, adhesion sites that attach the cell to its environment, and VASP, a protein that regulates actin. We developed a mathematical model formulated as a system of PDEs with a nonlocal integral term and noise. Numerical solutions lead to a number of predictions, including that VASP also exhibits a traveling wave out of phase with the actin wave, later discovered in further experiments. Our model also reveals a role for tension in the membrane that surrounds the cell, which would otherwise be difficult to observe directly by experiment.

March 7:
Speaker: Clint Dawson, University of Texas at Austin
Title: Discontinuous Galerkin methods for coastal ocean applications
Abstract: Flow and transport in the coastal ocean are described by coupled hydrodynamic systems describing currents, water levels, waves and atmosphere-ocean coupling. In addition, ocean circulation models can be used to drive transport models of, e.g., hydrocarbons in the coastal environment. In this talk, we will describe a discontinuous Galerkin framework for solving coupled systems arising in coastal ocean applications. DG methods have proven to be accurate at modeling coastal ocean physics, we will also discuss local time stepping methods aimed at improving the efficiency of DG methods.

March 28:
Speaker: Jean-Luc Thiffeault, University of Wisconsin-Madison
Title: Biomixing: when organisms stir their environment
Abstract: As fish, micro-organisms, or other bodies move through a fluid, they stir their surroundings. This can be beneficial to some fish, since the plankton they eat depends on a well-stirred medium to feed on nutrients. Bacterial colonies also stir their environment, and this is even more crucial for them since at small scales there is no turbulence to help mixing. It has even been suggested that the total biomass in the ocean makes a significant contribution to large-scale vertical transport, but this is still a contentious issue. We propose a simple model of the stirring action of moving bodies through both inviscid and viscous fluids. An attempt will be made to explain existing data on the displacements of small particles, which exhibits probability densities with exponential tails. A large-deviation approach helps to explain some of the data, but mysteries remain.
This is joint work with Steve Childress, George Lin, and Peter Mueller.

April 4:
Speaker: Lisa Fauci, Tulane University
Title: A Tale of Waving Tails: Calcium-Driven Dynamics of Undulatory Swimmers
Abstract: Locomotion due to body undulations is observed across the entire spectrum of swimming organisms, from microorganisms to fish. The internal force generating mechanisms range from the action of dynein molecular motors within a mammalian sperm to muscle activation in lamprey. We will present recent progress in building multiscale computational models that couple biochemistry, passive elastic properties and active force generation with a surrounding fluid for these two swimmers.

April 11:
Speaker: Mark Andrea de Cataldo , State University of New York, Stony Brook
Title: A curious symmetry: P=W.
Abstract: In this talk, which is aimed at non-experts, I will introduce two moduli spaces of structures on a compact Riemann surface, relate them via a result called non-abelian Hodge theorem, and then discuss a recently observed and somewhat mysterious symmetry relating their cohomology rings.
This is joint work with T. Hausel and L. Migliorini.

Fall 2012

September 6:
Speaker: János Kollár, Princeton University, currently visiting the University of Utah
Title: Local topology of analytic spaces
Abstract: Let M be a subset of Cⁿ defined as the common zero set of some holomorphic functions. What can one say about the local structure of M? It turns out that M is a smooth manifold almost everywhere. Our main interest is in the question: How complicated can M be at special points?
As an exercise, you can try to see what happens with M₁∈ C³ given by x²+y³+z⁶=0 and with M₂∈ C⁵ given by x²+y²+z²+t³+u⁵=0.

September 27:
Speaker: Mark Reeder, Boston College
Title: Geometric Invariant Theory and epipelagic representations of p-adic groups
Abstract: Geometric Invariant Theory (GIT) is the study of orbits of algebraic groups acting on vector spaces. Such actions arise in the "epipelagic zones" of a reductive p-adic group. Besides explaining the previous sentence, I will show how the GIT of epipelagic zones leads to new constructions of representations of p-adic algebraic groups. Such constructions lead, via the conjectural Local Langlands correspondence, to verifiable predictions relating p-adic Galois theory to complex simple Lie algebras, which otherwise appear to be completely different areas of mathematics.

October 18:
Speaker: Tyler Jarvis, Brigham Young University, currently visiting the University of Utah
Title: Binomial coefficients, exterior products, symmetric polynomials, and lambda rings in orbifold geometry
Abstract: I will talk about connections between binomial coefficients, exterior products, symmetric polynomials, and power sums. Although some of these ideas and relations predate Newton, they provide tools that are surprisingly useful for studying "modern" objects, including manifolds or varieties with group actions (orbifolds), representation theory, and resolutions of singularities.

November 8:
Speaker: Anna Vainchtein , University of Pittsburgh
Title: From discrete to continuum: kinetic relations and beyond
Abstract: Propagation of phase boundaries, cracks and dislocations in crystal lattices is associated with energy dissipation that takes place in atomically sharp transition zones. Classical continuum theories represent these lattice defects as singularities, and the information about their kinetics is lost. This can lead to non-uniqueness of solutions of the associated initial value problem unless an additional constitutive function that relates the velocity of a moving defect to the driving force is specified. This kinetic relation can be extracted from the underlying discrete model by considering a traveling wave solution representing the moving defect. In this talk, I will illustrate this by considering some prototypical discrete systems with nonconvex interactions. I will then introduce a more general concept of kinetic equations that are nonlocal in time.

November 15
Speaker: Dieter Kotschick, Ludwig-Maximilians-Universität München
Title: Characteristic numbers of algebraic varieties
Abstract: The Hirzebruch-Riemann-Roch theorem implies certain relations between the Hodge and Chern numbers of a complex projective variety. After proving his theorem in 1953, Hirzebruch formulated several natural problems about these characteristic numbers. For example, he asked to what extent the Hodge and Chern numbers are topological invariants of the underlying manifold. I will explain the answer to this question obtained in recent joint work with S. Schreieder. Along the way we proved that the Hirzebruch-Riemann-Roch relations are the only universal relations between Hodge and Chern numbers, and we gained some understanding of the collections of Hodge numbers for arbitrary compact Kähler manifolds.

November 29:
Speaker: Skip Garibaldi, Emory University, visiting UC San Diego
Title: Algebraic groups with the same tori
Abstract: Are matrix groups determined by their maximal tori? Over number fields, this is an old question attributed to Shimura. Translated into a question about rings, it asks: Are division algebras with the same subfields isomorphic or anti-isomorphic? The answers to these two questions are in many cases "no", but are "yes" in some interesting cases that have applications to analogues of the question "Can you hear the shape of a drum?" for locally symmetric spaces.

December 6: SPECIAL COLLOQUIUM
Speaker: Tom Alberts, California Institute of Technology
Title: Diffusions of Multiplicative Cascades
Abstract: A multiplicative cascade is a randomization of any measure on the unit interval, constructed from an iid collection of random variables indexed by the dyadic intervals. Given an arbitrary initial measure I will describe a method for constructing a continuous time, measure valued process whose value at each time is a cascade of the initial one. The process also has the Markov property, namely at any given time it is a cascade of the process at any earlier time. It has the further advantage of being a martingale and, under certain extra conditions, it is also continuous. I will discuss applications of this process to models of tree polymers and one-dimensional random geometry.
Joint work with Ben Rifkind (University of Toronto).