| Monday, March 17 Geometry and Topology Time: 15:30 Room: MC 107 Speaker: Agnes Beaudry (Univ. of Chicago) Title: Finite Resolutions and K(2)-Local Computations The chromatic filtration of stable homotopy breaks calculations one prime at a time and one level at a time. At chromatic level 2, finite resolutions of the K(2)-local sphere, have been a successful tool for computations. I will explain how to use such resolutions to do computations at the prime 2. |
| Tuesday, March 18 Geometry and Topology Time: 13:30 Room: MC 108 Speaker: Victor Snaith (Sheffield) Title: The bar-monomial resolution and applications to automorphic representations Admissible representations of locally $p$-adic Lie groups and automorphic representations of adelic Lie groups are important ingredients in modern number theory. This is because of their deep relationship to modular forms, L-series and Galois representations. This talk will explain how to construct these representations as objects (monomial resolutions) in a (non-abelian) derived category. This construction applies to representations defined over an algebraically closed field of any characteristic. The intended advantage of this point of view lies in the fact that in this derived category L-series and base base change have elementary descriptions. |
Analysis Seminar Time: 15:30 Room: MC 108 Speaker: Vassili Nestoridis (University of Athens) Title: Universality and regularity of the integration operator Let $Y$ denote the space of holomorphic functions in a planar domain $\Omega$, such that the derivatives of all orders extend continuously to the closure of $\Omega$ in the plane $\mathbb{C}$. We endow $Y$ with its natural topology and let $X$ denote the closure in $Y$ of all rational functions with poles off the closure of $\Omega$. Some universality results concerning Taylor series or Pade approximants are generic in $X$. In order to strengthen the above results we give a sufficient condition of geometric nature assuring that $X$=$Y$. In addition to this, if a Jordan domain $\Omega$ satisfies the above condition, then the primitive $F$ of a holomorphic function $f$ in $\Omega$ is at least as smooth on the boundary as $f$, even if the boundary of $\Omega$ has infinite length. This led us to construct a Jordan domain $\Omega$ supporting a holomorphic function $f$ which extends continuously on the closure of $\Omega$, such that its primitive $F$ is even not bounded in $\Omega$. Finally we extend the last result in generic form to more general Volterra operators.This is based on a joint work with Ilias Zadik. |
| Wednesday, March 19 Homotopy Theory Time: 14:30 Room: MC 107 Speaker: Mike Misamore (Western) Title: Applications of dg-categories |
| Thursday, March 20 Analysis Seminar Time: 11:30 Room: MC 108 Speaker: Nadya Askaripour (University of Cincinnati ) Title: Spaces of automorphic functions and projections on these spaces This will be a survey talk. Let R be a Riemann surface, I will talk about some spaces of automorphic functions on R. Poincare series map is one way to construct automorphic forms, but it might not be convergent when we have an automorphic function. Some projections on automorphic functions will be introduced, also I will show few applications of these projections. |
Index Theory Seminar Time: 12:00 Room: MC 107 Speaker: Matthias Franz (Western) Title: The infinitesimal index II This time we look at the cotangent bundle of a representation M of a torus. We discuss how the infinitesimal index gives an isomorphism between equivariant cohomology modules induced by the orbit filtration of M and certain spaces of splines which we are going to define. |
Colloquium Time: 15:30 Room: MC 107 Speaker: Uli Walther (Purdue) Title: Local cohomology (of determinantal ideals) We give an introduction to the theory of local cohomology by pointing out examples and its connections to topology, differential equations, and algebraic geometry. We discuss, in the presence of a field, some techniques for investigating local cohomology modules, focussing on the study of finiteness conditions. We show how the absence of a field, or singularities in the ambient space, complicate things significantly, and work out the case of the variety consisting of matrices of bounded rank over every field and over the integers. |