Webb's conjecture and generalised Harish-Chandra theory

TL;DR

This paper generalizes Webb's conjecture to finite reductive groups by linking the contractibility of certain orbit spaces to a new simplicial complex derived from Deligne--Lusztig theory, offering a topological approach to representation theory.

Contribution

It introduces a new simplicial complex associated with irreducible characters and proves a generalized Webb's conjecture using a condition related to Harish-Chandra theory.

Findings

Proves the generalized Webb's conjecture for finite reductive groups.

Shows the conjecture follows from the ($e$-HC-conj) condition.

Recovers Symonds' result under mild restrictions on prime $\, ext{ extlangle} \, ext{ extbackslash}ell$.

Abstract

Webb's conjecture states that the orbit space of the Brown complex of a finite group at any given prime $\ell$ is contractible. This conjecture was proved by Symonds in 1998. In this paper, we suggest a generalisation of Webb's conjecture for finite reductive groups. This is done by associating to each irreducible character a new simplicial complex defined in terms of Deligne--Lusztig theory. We then show that our conjecture follows from a condition, called ($e$-HC-conj) below, related to generalised Harish-Chandra theory. In particular, using earlier results of the author, we prove our conjecture and recover Symonds result for finite reductive groups under mild restrictions on the prime $\ell$. Finally, we show that the condition ($e$-HC-conj) is implied by the contractibility of the orbit spaces associated to our newly defined complex offering an unexplored topological approach to proving the uniqueness of $e$-cuspidal pairs up to conjugation.