English

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

Group Theory 2017-11-15 v1 Representation Theory

Abstract

Let GG be a discrete group with property (T). It is a standard fact that, in a unitary representation of GG on a Hilbert space H\mathcal{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\sigma, then the vector is close to a sub-representation isomorphic to σ\sigma: 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 GG with property (T) and such that C(G)C^*(G) is residually finite-dimensional, admits a unitary representation which is generic (i.e. the orbit of this representation in Rep(G,H)\mathrm{Rep}(G,\mathcal{H}) under the unitary group U(H)U(\mathcal{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)\mathrm{Rep}(G,\mathcal{H}).

Keywords

Cite

@article{arxiv.1711.04584,
  title  = {Property (T), finite-dimensional representations, and generic representations},
  author = {Michal Doucha and Maciej Malicki and Alain Valette},
  journal= {arXiv preprint arXiv:1711.04584},
  year   = {2017}
}
R2 v1 2026-06-22T22:44:10.671Z