Representations of a reductive p-adic group in characteristic distinct from p

Abstract

We investigate the irreducible cuspidal C-representations of a reductive p-adic group G over a field C of characteristic different from p. When C is algebraically closed, for many groups G, a list of cuspidal C-types (J,λ) has been produced satisfying exhaustion, sometimes for a restricted kind of cuspidal representations, and often unicity. We verify that those lists verify Aut(C)-stability and we produce similar lists when C is no longer assumed algebraically closed. Our other main results concern supercuspidality. This notion makes sense for the representations λ in the cuspidal C-types (J,λ) as above, which involve finite reductive groups. We check that an irreducible cuspidal representation of G induced from λ is supercuspidal if and only λ is supercuspidal.