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arxiv: math-ph/0212012 · v1 · submitted 2002-12-03 · 🧮 math-ph · math.MP· math.PR

Quasicrystals and almost periodicity

Jean-Baptiste Gouere This is my paper
classification 🧮 math-ph math.MPmath.PR
keywords measurealmostatomicautocorrelationdiffractiononlyperiodicitypoint
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We introduce a topology ${\cal T}$ on the space $U$ of uniformly discrete subsets of the Euclidean space. Assume that $S$ in $U$ admits a unique autocorrelation measure. The diffraction measure of $S$ is purely atomic if and only if $S$ is almost periodic in $(U,{\cal T})$. This result relates idealized quasicrystals to almost periodicity. In the context of ergodic point processes, the autocorrelation measure is known to exist. Then, the diffraction measure is purely atomic if and only if the dynamical system has a pure point spectrum. As an illustration, we study deformed model sets.

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  1. On almost periodicity in crystalline measures

    math.FA 2026-05 unverdicted novelty 7.0

    Crystalline measures are almost periodic if and only if translation bounded; new constructions resolve Meyer's and Favorov's questions by exhibiting crystalline measures that are not translation bounded even as distributions.