Property (T), finite-dimensional representations, and generic representations

Abstract

Let G be a discrete group with property (T). It is a standard fact that, in a unitary representation of G on a Hilbert space H, almost invariant vectors are close to invariant vectors, in a quantitative way. We begin by showing that, if a unitary representation has some vector whose coefficient function is close to a coefficient function of some finite-dimensional unitary representation σ, then the vector is close to a sub-representation isomorphic to σ: this makes quantitative a result of P.S. Wang [Wa]. We use that to give a new proof of a result by D. Kerr, H. Li and M. Pichot [KLP], that a group G with property (T) and such that C*(G) is residually finite-dimensional, admits a unitary representation which is generic (i.e. the orbit of this representation in Rep(G,H) under the unitary group U(H) is comeager). We also show that, under the same assumptions, the set of representations equivalent to a Koopman representation is comeager in Rep(G,H).