2019
DOI: 10.1016/j.jfa.2018.10.017
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Spectrality and non-spectrality of the Riesz product measures with three elements in digit sets

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Cited by 38 publications
(14 citation statements)
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“…Many affirmative results have been obtained in [1][2][3][4][5]11,15,19,27,32]. When all Hadamard triples are the same one, the infinite convolution reduces to a self-affine measure (which is called a self-similar measure for d = 1).…”
Section: Question Given a Sequence Of Hadamard Triplesmentioning
confidence: 97%
“…Many affirmative results have been obtained in [1][2][3][4][5]11,15,19,27,32]. When all Hadamard triples are the same one, the infinite convolution reduces to a self-affine measure (which is called a self-similar measure for d = 1).…”
Section: Question Given a Sequence Of Hadamard Triplesmentioning
confidence: 97%
“…Thus, we have that is a spectrum of and is an orthogonal set of . The following lemma is motivated by Theorem 2.3 in [2] and easy to prove.…”
Section: Preliminaries and The Sufficiency Of Theorem 11mentioning
confidence: 97%
“…In 1998, Jorgensen and Pedersen [24] gave the first singular spectral measure: the standard middle-fourth Cantor measure. Following these discoveries, many more examples of fractal spectral measures have been constructed, such as self-similar measures [4, 26], self-affine measures [11, 17, 31] and Moran measures [2, 3, 19]. It is surprising that there are many distinctive phenomena that singular spectral measures do have but the absolutely continuous ones do not.…”
Section: Introductionmentioning
confidence: 99%
See 1 more Smart Citation
“…Many affirmative partial results have been obtained for this question, see [1][2][3][4][5]18,20,25,35]. If all Hadamard triples (R k , B k , L k ) = (R, B, L), then the infinite convolution reduces to a self-affine measure.…”
Section: Given a Sequence Of Hadamard Triplesmentioning
confidence: 99%