Spectrality of a class of infinite convolutions on R
Abstract
Given an integer m≥1. Let (m)=\1,2, ·s, m\N be a symbolic space, and let \(bk,Dk)\k=1m:=\(bk, \0,1,·s, pk-1\tk) \k=1m be a finite sequence pairs, where integers | bk| , pk≥2, |tk|≥ 1 and pk,t1,t2, ·s, tm are pairwise coprime integers for all 1≤ k≤ m. In this paper, we show that for any infinite word σ=(σn)n=1∞∈(m), the infinite convolution μσ=δbσ1-1 Dσ1 * δ(bσ1 bσ2)-1 Dσ2 * δ(bσ1 bσ2 bσ3)-1Dσ3 * ·s is a spectral measure if and only if pσn bσn for all n≥2 and σ l=1∞Πl, where Πl=\i1i2·s ilj∞∈(m): il≠ j, |bj|=pj, |tj|≠1\.
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