Functional Hecke algebras and simple Bernstein blocks of a p-adic GLn in non-defining characteristic

Abstract

Let Gn=GLn(F), where F is a non-archimedean local field with residue characteristic p and where n=2k is even. In this article, we investigate a question occurring in the decomposition of the category of -modular smooth representations of Gn into Bernstein blocks (where ≠ p). The easiest block not investigated in guiraud is the one defined by the standard parabolic subgroup with Levi factor M=k(F) × k(F) and by an M-representation of the form π0 π0 with π0 a supercuspidal k(F)-representation. This block is Morita equivalent to a Hecke algebra which we can describe as a twisted tensor product of a finite Hecke algebra (i. e. a Hecke algebra occurring in the representation theory of the finite group k(pα) in non-defining characteristic ) and the group ring of Z2. This enables us to describe how a conjectured connection between finite Hecke algebras (which is similar to a connection postulated by Brou\'e in Broue) would lead to an equivalence between the described block and the unipotent block of GL2(Fk), where Fk is the unramified extension of degree k over F.