Homological Finiteness of Representations of Almost Linear Nash Groups

Abstract

Let G be an almost linear Nash group, namely, a Nash group that admits a Nash homomorphism with finite kernel to some k( R). A smooth representation V with moderate growth of G is called homologically finite if the Schwartz homology i(G;V) is finite dimensional for every i∈. We show that the space of Schwartz sections (X,) of a tempered G-vector bundle (X,) is homologically finite as a representation of G, under some mild assumptions.