Strong density of spherical characters attached to unipotent subgroups

Abstract

We prove the following result in relative representation theory of a reductive p-adic group G: Let U be the unipotent radical of a minimal parabolic subgroup of G, and let be an arbitrary smooth character of U. Let S ⊂ Irr(G) be a Zariski dense collection of irreducible representations of G. Then the span of the Bessel distributions Bπ attached to representations π from S is dense in the space S*(G)U× U, × of all (U× U, × )-equivariant distributions on G. We base our proof on the following results: 1. The category of smooth representations M(G) is Cohen-Macaulay. 2. The module indUG() is a projective module.