Talk

Plenary talk at the conference "33èmes Journées Arithmétiques", Luxembourg:
https://www.uni.lu/fstm-en/conferences/ja25/

This talk will be streamed from the MPIM lecture hall, Bonn. 

In recent years, significant progress has been made in understanding families of Legendrians in 3-dimensional contact topology. For instance, the homotopy type of the component of the max-tb Legendrian unknot (or any algebraic link) in the standard contact 3-sphere is now completely understood. However, the existence of non-flexible families of Legendrians has remained an open question. In this talk, we will explore this question in the context of loops of Legendrians.

We will collect questions and then decide on one or two topics to discuss in more depth.

In joint work in progress with Hevesi, Thorne and Whitmore we prove that the global Galois representations associated with cuspidal, cohomological automorphic representations are compatible with the (semisimplified) local Langlands correspondence. In this talk I will explain the context and meaning of this statement. Moreover, I will sketch the proof of the main new technical ingredient, which is a uniform bound on the torsion in the cohomology of certain unitary Shimura varieties.

Venue: Endenicher Allee 60, Room 1.007, Math. Center, University of Bonn

Lectures 3 & 4 by Carlo 

By a log-symplectic form I mean a meromorphic closed non-degenerate 2-form omega on a complex manifold X that has only simple poles along a divisor D. I will discuss how the de Rham class of omega in H^2(X\D) determines the deformations of the triple (X,D,omega). Some open problems about topology of the divisor deforming D will be discussed.