The continuity of Beurling density and Beurling dimension of spectra of a class of self-affine spectral measures

Abstract

It is well-known that the Beurling dimension of the spectra of certain singularly continuous spectral measures possesses an intermediate property. In this paper, we establish that for a class of self-affine spectral measures μ, both the Beurling dimension and Beurling density of their spectra attain full flexibility simultaneously. Specifically, for any t∈ (0,Hw((μ))] and s∈ [0,∞), there exists a spectrum :=t,s of μ satisfying \[Be()=t Dt+()=s\] where Hw denotes the pseudo Hausdorff dimension, Be denotes the Beurling dimension and Dt+ denotes the t-Beurling density. These results provide new insights into the structure of the spectra for a singularly continuous spectral measure.

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