Jacquet modules of Tate cohomology and base change lifting

Abstract

Let G be a connected reductive group defined over a non-Archimedean local field F of residue characteristic p. Let be a prime number distinct from p. Let E be a cyclic Galois extension of F with [E:F]=. Let be a finite length F-representation (or an -modular representation) of G(E) Gal(E/F). In this context, we prove a conjecture of Treumann and Venkatesh which predicts that the Tate cohomology groups Hi( Gal(E/F), ) are finite length representations of G(F). We discuss the explicit computation of these Tate cohomology groups when G is GLn and is obtained as a base change lifting of a depth-zero cuspidal representation of GLn(F). The primary novelty from our previous work is that we treat the case where is possibly non-cuspidal. We also study the Gal(Fq/Fq)-Tate cohomology groups of the mod- reduction of the unipotent cuspidal representation of Sp4(Fq).