Principal series component of Gelfand-Graev representation

Abstract

Let G be a connected reductive group defined over a non-archimedean local field F. Let B be a minimal F-parabolic subgroup with Levi factor T and unipotent radical U. Let be a non-degenerate character of U(F) and λ a character of T(F). Let (K,) be a Bushnell-Kutzko type associated to the Bernstein block of G(F) determined by the pair (T,λ). We study the -isotypical component (c-indU(F)G(F)) of the induced space c-indU(F)G(F) of functions compactly supported mod U(F). We show that (c-indU(F)G(F)) is cyclic module for the Hecke algebra H(G,) associated to the pair (K,). When T is split, we describe it more explicitly in terms of H(G,). We make assumptions on the residue characteristic of F and later also on the characteristic of F and the center of G depending on the pair (T,λ). Our results generalize the main result of Chan and Savin in CS18 who treated the case of λ=1 for T split.