On loop Deligne--Lusztig varieties of Coxeter-type for inner forms of GLn

Abstract

For a reductive group G over a local non-archimedean field K one can mimic the construction from the classical Deligne--Lusztig theory by using the loop space functor. We study this construction in special the case that G is an inner form of GLn and the loop Deligne--Lusztig variety is of Coxeter type. After simplifying the proof of its representability, our main result is that its -adic cohomology realizes many irreducible supercuspidal representations of G, notably almost all among those whose L-parameter factors through an unramified elliptic maximal torus of G. This gives a purely local, purely geometric and -- in a sense -- quite explicit way to realize special cases of the local Langlands and Jacquet--Langlands correspondences.