Weak Convergence and Spectrality of Infinite Convolutions
Abstract
Let \ Ak\k=1∞ be a sequence of finite subsets of Rd satisfying that \# Ak 2 for all integers k 1. In this paper, we first give a sufficient and necessary condition for the existence of the infinite convolution =δA1*δA2 * ·s *δAn*·s, where all sets Ak ⊂eq R+d and δA = 1\# A Σa ∈ A δa. Then we study the spectrality of a class of infinite convolutions generated by Hadamard triples in R and construct a class of singular spectral measures without compact support. Finally we show that such measures are abundant, and the dimension of their supports has the intermediate-value property.
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