Hadamard triples generate self-affine spectral measures

Dutkay, Dorin Ervin; Lai, Chun–Kit; Haussermann, John

doi:10.1090/tran/7325

Cited by 128 publications

(63 citation statements)

References 52 publications

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“…The conjecture holds in several special cases, its also holds with additional conditions. More recently, Dutkay, Haussermann and Lai [3] proved that the conjecture is true. So the remaining problem relating to this compatible pair case is to determine all the spectra for such a measure μ M,D .…”

Section: Introductionmentioning

confidence: 95%

Duality relation on spectra of self-affine measures

2016

Math. Nachr.

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The present paper establishes a duality relation for the spectra of self‐affine measures. This is done under the condition of compatible pair and is motivated by a duality conjecture of Dutkay and Jorgensen on the spectrality of self‐affine measures. For the spectral self‐affine measure, we first obtain a structural property of spectra which indicates that one can get new spectra from old ones. We then establish a duality property for the spectra which confirms the conjecture in a certain case.

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Section: Introductionmentioning

confidence: 95%

Duality relation on spectra of self-affine measures

2016

Math. Nachr.

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“…This surprising discovery has received a lot of attention, and the research on the spectrality of self-affine measures has become an interesting topic. Also, new spectral measures were found in [9], [1]- [6], [13]- [14] and references cited therein. A related problem is the non-spectral problem of self-affine measure.…”

Section: Introductionmentioning

confidence: 97%

Non-spectral problem for the planar self-affine measures

Liu

Dong

2017

Journal of Functional Analysis

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“…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%

Spectrality of Moran Sierpinski-type measures on

Zhang

2021

Can. Math. Bull.

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Let $M=$ diag $(\rho _1,\rho _2)\in M_{2}({\mathbb R})$ be an expanding matrix and Let $\{D_n\}_{n=1}^{\infty }$ be a sequence of digit sets with $D_n=\left \{(0, 0)^T,\,\,\,(a_n, 0 )^T, \,\,\, (0, b_n )^T \right \}$ , where $a_n, b_n\in \{-1,1\}$ . The associated Borel probability measure $$ \begin{align*} \mu_{M,\{D_n\}}:=\delta_{M^{-1}D_1}\ast \delta_{M^{-2}D_2}\ast \delta_{M^{-3}D_3}\ast \cdots \end{align*} $$ is called a Moran Sierpinski-type measure. In this paper, we show that $\mu _{M, \{D_n\}}$ is a spectral measure if and only if $3\mid \rho _i$ for each $i=1, 2$ . The special case is the Sierpinski-type measure with $a_n=b_n=1$ for all $n\in {\mathbb N}$ , which is proved by Dai et al. [Appl. Comput. Harmon. Anal. (2020), https://doi.org/10.1016/j.acha.2019.12.001].

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Hadamard triples generate self-affine spectral measures

Abstract: Let R R be an expanding matrix with integer entries, and let B , L B,L be finite integer digit sets so that ( R , B , L ) (R,B,L) form a Hadamard triple on R d {\mathbb {R}}^d in the sense that the matrix 1 | det R … Show more

Cited by 128 publications

References 52 publications

Duality relation on spectra of self-affine measures

Duality relation on spectra of self-affine measures

Non-spectral problem for the planar self-affine measures

Spectrality of Moran Sierpinski-type measures on

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