A comparison of endomorphism algebras

Abstract

Let F be a non-archimedean local field and G be a connected reductive group over F. For a Bernstein block in the category of smooth complex representations of G(F), we have two kinds of progenerators: the compactly induced representation indKG(F) () of a type (K, ), and the parabolically induced representation IPG(M) of a progenerator M of a Bernstein block for a Levi subgroup M of G. In this paper, we construct an explicit isomorphism of these two progenerators. Moreover, we compare the description of the endomorphism algebra EndG(F)(indKG(F) ()) for a depth-zero type (K, ) by Morris with the description of the endomorphism algebra EndG(F)(IPG(M)) by Solleveld, that are described in terms of affine Hecke algebras.