Spectrality of random convolutions generated by finitely many Hadamard triples

Abstract

Let \(Nj, Bj, Lj): 1 j m\ be finitely many Hadamard triples in R. Given a sequence of positive integers \nk\k=1∞ and ω=(ωk)k=1∞ ∈ \1,2,·s, m\N, let μω,\nk\ be the infinite convolution given by μω,\nk\ = δNω1-n1 Bω1 * δNω1-n1 Nω2-n2 Bω2 * ·s * δNω1-n1 Nω2-n2 ·s Nωk-nk Bωk * ·s. In order to study the spectrality of μω,\ nk\, we first show the spectrality of general infinite convolutions generated by Hadamard triples under the equi-positivity condition. Then by using the integral periodic zero set of Fourier transform we show that if gcd(Bj - Bj)=1 for 1 j m, then all infinite convolutions μω,\nk\ are spectral measures. This implies that we may find a subset ω,\nk\⊂eq R such that \ eλ(x) = e2π i λ x: λ ∈ ω,\nk\ \ forms an orthonormal basis for L2(μω,\ nk\).