Existence and Spectrality of random measures generated by infinite convolutions

Abstract

In this paper, we construct a class of random measures μn by infinite convolutions. Given infinitely many admissible pairs \(Nk, Bk)\k=1∞ and a positive integral sequence n=\nk\k=1∞, for every ω∈ NN, we write μn(ω) = δNω1-n1Bω1 * δNω1-n1Nω2-n2Bω2 * ·s. If nk=1 for k≥ 1, write μ(ω)=μn(ω). First, we show that the mapping μn: (ω, B) μn(ω)(B) is a random measure if the family of Borel probability measures \μ(ω) : ω ∈ NN\ is tight. Then, for every Bernoulli measure P on NN, the random measure μn is also a spectral measure P-a.e.. If the positive integral sequence n is unbounded, the random measure μn is a spectral measure regardless of the measures on the sequence space NN. Moreover, we provide some sufficient conditions for the existence of the random measure μn. Finally, we verify that random measures have the intermediate-value property.

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