Wiener-Pitt sets for compact Abelian groups

Abstract

Suppose that G is a compact Hausdorff Abelian group. We say μ ∈ M(G) is strongly continuous if |μ|(x+H)=0 for any x ∈ G and any H ≤ G that is closed and of infinite index. We prove that for any sufficiently rapidly decreasing sequence (an)n=1∞∈ c0(N), for every strongly continuous μ∈ M(G) with \|μ\| ≤ 1 and μ(G)⊂ \an: n ∈ N\\0\, the measure μμ is absolutely continuous with respect to Haar measure on G. This implies that μ does not exhibit the so-called Wiener-Pitt phenomenon. The paper is a continuation of investigations started in ow.

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