Shintani relation for base change: unitary and elliptic representations

Abstract

Let E/F be a cyclic extension of p-adic fields and n a positive integer. Arthur and Clozel constructed a base change process π πE which associates to a smooth irreducible representation of GLn(F) a smooth irreducible representation of GLn(E), invariant under Gal(E/F). When π is tempered, πE is tempered and is characterized by an identity (the Shintani character relation) relating the character of π to the character of πE twisted by the action of Gal(E/F). In this paper we show that the Shintani relation also holds when π is unitary or elliptic. We prove similar results for the extension C/R. As a corollary we show that for a cyclic extension E/F of number fields the base change for automorphic residual representations of the ad\`ele group GLn(AF) respects the Shintani relation at each place of F.