Spectrality and non-spectrality of a class of Moran measures with three-element digits
Abstract
A Borel probability measure \( μ \) with compact support on \( Rn \) is called spectral measure if there exists a discrete set \( ⊂ Rn \) such that \( E := \e2π i λ, x : λ ∈ \ \) forms an orthonormal basis of \( L2(μ) \). In this paper, we study the spectrality and non-spectrality of a class of Moran measures with three-element digits on \( R \). Let pn∈ 3 Z\0\ and Dn=\0,an,bn\ with \an,bn\=\-1,1\ 3. It is know that the infinite convolution of uniformly discrete probability measures μ\pn\,\ Dn\:=δp1-1\0,a1,b1\δ(p1p2)-1\0,a2,b2\·s is a Moran measure with compact support if and only if align* Σn=1∞|p1p2·s pn|-1dn<∞, where\;dn=\0,|an|, |bn|\. align* Without the condition n≥ 1\|an|+|bn||pn|\<∞, we give two sufficient conditions under which that μ\pn\,\ Dn\ is a spectral measure. If pn=p>2 and Dn=\0,an,bn\ with (an,bn)=1, we also find an useful condition to guarantee that μp,\ Dn\ is not a spectral measure. Our results extend some known theorems in An et al. [JFA, 2019] and Lu et al. [JFAA, 2022].
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