Activities This Week
Second Local Model Theory Day
Dec 17, 11:00—17:00, 2017, Math -101
Operator Algebras and Operator Theory
de Branges Spaces on Compact Riemann Surfaces
Dec 18, 16:00—17:00, 2017, -101
Speaker
Arel Pinhas (BGU)
Abstract
It is a well-known fact that 1D systems and non-selfadjoint operators are closely related via the notion of operator colligation. The study of the characteristic function of a colligation is related to the study of de Branges spaces of analytic functions on an open set in the Riemann sphere. It allows us, for instance, to give an alternative proof for the Beurling’s Theorem using Livšic Colligations and de Branges spaces.
In this talk, I will characterize de Branges spaces, i.e. reproducing kernel Hilbert spaces of analytic sections defined on a real compact Riemann surface, rather than on the Riemann sphere. This is done through the vessel theory, a generalization of the colligation theory to the case of $n$-tuple commuting non-selfadjoint operators. The characteristic function of a vessel is then a bundle mapping defined on a compact Riemann surfaces and which also carries the input-output relation of a 2D system. As a consequence, I will introduce a Beurling-type Theorem on finite bordered Riemann surfaces.
Logic, Set Theory and Topology
On Vietoris hyperspaces for some Boolean algebras
Dec 19, 12:15—13:30, 2017, Math -101
Speaker
Robert Bonnet (CNRS) (Université de Savoie-Mont Blanc, France)
Colloquium
Approximations of convex bodies by measure-generated sets
Dec 19, 13:00—14:00, 2017, Math -101
Speaker
Boaz Slomka (University of Michigan)
Abstract
Problems pertaining to approximation and their applications have been extensively studied in the theory of convex bodies. In this talk we discuss several such problems, and focus on their extension to the realm of measures. In particular, we discuss variations of problems concerning the approximation of convex bodies by polytopes with a given number of vertices. This is done by introducing a natural construction of convex sets from Borel measures. We provide several estimates concerning these problems, and describe an application to bounding certain average norms.
Based on joint work with Han Huang
Algebraic Geometry and Number Theory
Poles of the Standard L-function and Functorial Lifts for G2
Dec 20, 15:10—16:30, 2017, Math -101
Speaker
Avner Segal (UBC)
Abstract
The functoriality conjecture is a key ingredient in the theory of automorphic forms and the Langlands program. Given two reductive groups G and H, the principle of functoriality asserts that a map r:G^->H^ between their dual complex groups should naturally give rise to a map r*:Rep(G)->Rep(H) between their automorphic representations. In this talk, I will describe the idea of functoriality, its connection to L-functions and recent work on weak functorial lifts to the exceptional group of type G_2.