On the spectrality of a class of Moran measures
Abstract
In this paper, we study the spectrality of a class of Moran measures μP,D on R generated by \(pn,Dn)\n=1∞, where P=\pn\n=1∞ is a sequence of positive integers with pn>1 and D=\Dn\n=1∞ is a sequence of digit sets of N with the cardinality \#Dn∈ \2,3,Nn\. We find a countable set ⊂R such that the set \e-2π i λ x|λ∈\ is a orthonormal basis of L2(μP,D) under some conditions. As an application, we show that when μP,D is absolutely continuous, μP,D not only is a spectral measure, but also its support set tiles R with Z.
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