Spectral properties of a class of Sierpinski-type Moran measures on Rn

Abstract

Let the infinite convolutions equation* μ\Rk\,\Dk\=δR1-1D1*δR1-1R2-1D2*δR1-1R2-1R3-1D3*…i equation* be generated by the sequence of pairs \(\ (Rk,Dk) \k=1∞ \), where Rk∈ Mn(Z) is an expanding integer matric, Dk is a finite integer digit sets that satisfies the following two conditions: (i). \( \# Dk = m \) and \( m>2 \) is a prime; (ii). \( \x: Σd∈ Dke2π i d,x =0\ =i=1φ(k)j=1m-1(jmk,i+Zn) \) for some \( k,i ∈ \ (l1, ·s, ln)t : li ∈ [1, m-1] Z, 1≤ i≤ n \ \). In this paper, we study the spectrality of μ\Rk\,\Dk\, and some necessary and sufficient conditions for \( L2(μ\Rk\,\Dk\) \) to have an orthogonal exponential function basis are established. Finally, we discuss the explanations and applications of our results.