Spectra of averages of unitary representations of LCA groups
Abstract
Let G be a locally compact Abelian (LCA) group with dual group Γ, and let μ be a probability measure on (the Borel sets of) G. Given a unitary representation \U(t): t ∈ G\ in a complex Hilbert space H, we study the spectrum of the μ-average V:=∫G U(t)dμ(t) (defined in the strong topology of H). We prove that σ(V) ⊂ μ(Γ) and give a sufficient condition for equality. Using the spectral measure E(·) given by the general Stone theorem, we prove a (weak) spectral mapping theorem for the operators U(ν):=∫GU(t)dν(t), where ν is any bounded complex measure on G. For a unitary representation of Z, defined by the powers of a unitary operator U, we prove that σ(V)=μ(σ(U)). For a unitary representation of R, given as U(t)= eitB (t∈ R), we show that σ(V)=μ(σ(B)).
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