Abstract
We extend a discrepancy bound of Lagarias and Pleasants for local weight distributions on linearly repetitive Delone sets and show that a similar bound holds also for the more general case of Delone sets without finite local complexity if linear repetitivity is replaced by ɛ-linear repetitivity. As a result we establish that Delone sets that are ɛ-linear repetitive for some sufficiently small ɛ are rectifiable, and that incommensurable multiscale substitution tilings are never almost linearly repetitive.
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