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Paper detail

Tower systems for Linearly repetitive Delone sets

In this paper we study linearly repetitive Delone sets and prove, following the work of Bellissard, Benedetti and Gambaudo, that the hull of a linearly repetitive Delone set admits a properly nested sequence of box decompositions (tower system) with strictly positive and uniformly bounded (in size and norm) transition matrices. This generalizes a result of Durand for linearly recurrent symbolic systems. Furthermore, we apply this result to give a new proof of a classic estimation of Lagarias and Pleasants on the rate of convergence of patch-frequencies.

preprint2010arXivOpen access
José Aliste-PrietoDaniel Coronel
math-phmath.DSmath.MP
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José Aliste-PrietoDaniel Coronel

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