Representations of p-adic Groups

Abstract

Representation theory of $p$-adic groups is a topic at a crossroads. It links among others to harmonic analysis, algebraic geometry, number theory, Lie theory, and homological algebra. The atomic objects in the theory are supercuspidal representations. Most of their aspects have a strong arithmetic flavour, related to Galois groups of local fields. All other representations are built from these atoms by parabolic induction, whose study involves Hecke algebras and complex algebraic geometry. In the local Langlands program, connections between various aspects of representations of $p$-adic groups have been conjectured and avidly studied.

This workshop brought together mathematicians from various back- \linebreak grounds, who hold the promise to contribute to the solution of open problems in the representation theory of $p$-adic groups. Topics included explicit local Langlands correspondences, Hecke algebras for Bernstein components, harmonic analysis, covering groups and $\ell$-modular representations of reductive $p$-adic groups.