A proof of Casselman's comparison theorem for standard minimal parabolic subalgebra

Abstract

Let G be a real linear reductive group and K be a maximal compact subgroup. Let P be a minimal parabolic subgroup of G with complexified Lie algebra p, and n be its nilradical. In this paper we show that: for any admissible finitely generated moderate growth smooth Fr\'echet representation V of G, the inclusion VK⊂ V induces isomorphisms Hi(n,VK) Hi(n,V) (i≥ 0), where VK denotes the (g,K) module of K finite vectors in V. This is called Casselman's comparison theorem. As a consequence, we show that: for any k≥ 1, nkV is a closed subspace of V and the inclusion VK⊂ V induces an isomorphism VK/nkVK= V/nkV. This strengthens Casselman's automatic continuity theorem.