A spectral gap property for random walks under unitary representations

Abstract

Let G be a locally compact group and μ a probability measure on G, which is not assumed to be absolutely continuous with respect to Haar measure. Given a unitary representation (π, H) of G, we study spectral properties of the operator π(μ) acting on H. Assume that μ is adapted and that the trivial representation 1G is not weakly contained in the tensor product π π. We show that π(μ) has a spectral gap, that is, for the spectral radius r spec(π(μ)) of π(μ), we have r spec(π(μ))<1. This provides a common generalization of several previously known results. Another consequence is that, if G has Kazhdan's Property (T), then r spec(π(μ))<1 for every unitary representation π of G without finite dimensional subrepresentations. Moreover, we give new examples of so-called identity excluding groups.

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