Orthogonal Exponentials of Planar Self-Affine Measures with Four-Element Digit Set
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Publication:5882284
DOI10.4208/JMS.V55N3.22.07OpenAlexW4294163108MaRDI QIDQ5882284
Publication date: 15 March 2023
Published in: Journal of Mathematical Study (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.4208/jms.v55n3.22.07
Orthogonal functions and polynomials, general theory of nontrigonometric harmonic analysis (42C05) Fractals (28A80)
Cites Work
- Spectral property of Cantor measures with consecutive digits
- When does a Bernoulli convolution admit a spectrum?
- Non-spectrality of self-affine measures on the spatial Sierpinski gasket
- Non-spectral problem for the planar self-affine measures
- Spectra of a class of self-affine measures
- Analysis of orthogonality and of orbits in affine iterated function systems
- Spectral property of the Bernoulli convolutions
- On the spectra of a Cantor measure
- The cardinality of certain \(\mu _{M,D}\)-orthogonal exponentials
- Dense analytic subspaces in fractal \(L^2\)-spaces
- Orthogonal exponential functions of self-similar measures with consecutive digits in \(\mathbb{R}\)
- Commuting self-adjoint partial differential operators and a group theoretic problem
- On spectral Cantor measures
- Spectrality of one dimensional self-similar measures with consecutive digits
- Non-spectrality of self-affine measures on the three-dimensional Sierpinski gasket
- Sierpinski-type spectral self-similar measures
- On spectral \({N}\)-Bernoulli measures
- Spectrality of self-affine Sierpinski-type measures on \(\mathbb{R}^2\)
- Spectrality of self-affine measures on the three-dimensional Sierpinski gasket
- Hadamard triples generate self-affine spectral measures
- Orthogonal exponentials of self-affine measures on ℝn
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