On the minimal period of integer tilings
Abstract
If a finite set A tiles the integers by translations, it also admits a tiling whose period M has the same prime factors as |A|. We prove that the minimal period of such a tiling is bounded by (c( D)2/ D), where D is the diameter of A. In the converse direction, given ε>0, we construct tilings whose minimal period has the same prime factors as |A| and is bounded from below by D3/2-ε. We also discuss the relationship between minimal tiling period estimates and the Coven-Meyerowitz conjecture.
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