Loop Spaces and Representations

TL;DR

This paper integrates loop spaces from derived algebraic geometry into representation theory, revealing new relationships between categories like Hecke categories and Langlands parameters through geometric and topological methods.

Contribution

It introduces a novel framework using loop spaces to unify and extend understanding of categories and parameters in representation theory, connecting geometric objects with algebraic structures.

Findings

Finite Hecke categories recovered from affine Hecke categories via localization

D-modules on the nilpotent cone related to coherent sheaves on the commuting variety

Categorical Langlands parameters arise naturally from loop space analysis of flag varieties

Abstract

We introduce loop spaces (in the sense of derived algebraic geometry) into the representation theory of reductive groups. In particular, we apply the theory developed in our previous paper arXiv:1002.3636 to flag varieties, and obtain new insights into fundamental categories in representation theory. First, we show that one can recover finite Hecke categories (realized by D-modules on flag varieties) from affine Hecke categories (realized by coherent sheaves on Steinberg varieties) via S^1-equivariant localization. Similarly, one can recover D-modules on the nilpotent cone from coherent sheaves on the commuting variety. We also show that the categorical Langlands parameters for real groups studied by Adams-Barbasch-Vogan and Soergel arise naturally from the study of loop spaces of flag varieties and their Jordan decomposition (or in an alternative formulation, from the study of local systems on a Moebius strip). This provides a unifying framework that overcomes a discomforting aspect of the traditional approach to the Langlands parameters, namely their evidently strange behavior with respect to changes in infinitesimal character.