A spectral gap property for subgroups of finite covolume in Lie groups

Abstract

Let G be a real Lie group and H a lattice or, more generally, a closed subgroup of finite covolume in G. We show that the unitary representation lambdaG/H of G on L2(G/H) has a spectral gap, that is, the restriction of lambdaG/H to the orthogonal of the constants in L2(G/H) does not have almost invariant vectors. This answers a question of G. Margulis. We give an application to the spectral geometry of locally symmetric Riemannian spaces of infinite volume.