On the beurling dimension of exponential frames.Advances in Mathematics, 226(1):285–297

Dorin Ervin Dutkay, Deguang Han, Qiyu Sun, Eric Weber · 2011

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math.CA · 2026-05-18 · unverdicted · novelty 7.0

The paper gives a complete characterization of maximal orthogonal exponential sets in L2 of a class of Cantor measures with contraction p^{-α}, proving that each successive base-N digit of frequencies in such a set has exactly m choices and that these sets correspond to labelings of an m-homogeneous

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On the spectra of Cantor measures math.CA · 2026-05-18 · unverdicted · none · ref 4
The paper gives a complete characterization of maximal orthogonal exponential sets in L2 of a class of Cantor measures with contraction p^{-α}, proving that each successive base-N digit of frequencies in such a set has exactly m choices and that these sets correspond to labelings of an m-homogeneous

On the beurling dimension of exponential frames.Advances in Mathematics, 226(1):285–297

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