Families over the integral Bernstein Center and Tate cohomology of local Base change lifts for GL(n, F)

Abstract

Let p and l be distinct odd primes, and let F be a p-adic field. Let π be a generic smooth integral representation of GLn(F) over an Ql-vector space. Let E be a finite Galois extension of F with [E:F]=l. Let be the base change lift of π to the group GLn(E). Let W0(, E) be the lattice of Zl-valued functions in the Whittaker model of , with respect to a standard Gal(E/F)-equivaraint additive character E:E→ Ql×. We show that the unique generic sub-quotient of the zero-th Tate cohomology group of W0(, E) is isomorphic to the Frobenius twist of the unique generic sub-quotient of the mod-l reduction of π. We first prove a version of this result for a family of smooth generic representations of GLn(E) over the integral Bernstein center of GLn(F). Our methods use the theory of Rankin-selberg convolutions and simple identities of local γ-factors. The results of this article remove the hypothesis that l does not divide the pro-order of GLn-1(F) in our previous work.