Spectra of the Sierpi\'nski type spectral measure and their Beurling dimensions

Abstract

In this paper, we study the structure of the spectra for the Sierpi\'nski type spectral measure μA,D on R2. We give a sufficient and necessary condition for the family of exponential functions \e-2π iλ, x: λ∈\ to be a maximal orthogonal set in L2(μA,D). Based on this result, we obtain a class of regular spectra of μA,D. Moreover, we discuss the Beurling dimensions of the spectra and obtain the optimal upper bound of Beurling dimensions of all spectra, which is in stark contrast with the case of self-similar spectral measure. An intermediate property about the Beurling dimension of the spectra is obtained.