On e-local structures for Z-spetses

Abstract

Let q be a prime power, a prime not dividing q, and e the order of q modulo . We show that the geometric realisation of the nerve of the transporter category of e-split Levi subgroups of a finite reductive group G over Fq is homotopy equivalent to the classifying space BG up to -completion. We suggest a generalisation of this equivalence to the setting of Z-reflection cosets and establish a related fact involving the associated orbit spaces. We also establish a Dade-like formula for unipotent characters of Z-spetses inspired by a question of Brou\'e.