Metallic mean Wang tiles I: self-similarity, aperiodicity and minimality
Abstract
For every positive integer n, we introduce a set Tn made of (n+3)2 Wang tiles (unit squares with labeled edges). We represent a tiling by translates of these tiles as a configuration Z2n. A configuration is valid if the common edge of adjacent tiles has the same label. For every n≥1, we show that the Wang shift n, defined as the set of valid configurations over the tiles Tn, is self-similar, aperiodic and minimal for the shift action. We say that \n\n≥1 is a family of metallic mean Wang shifts, since the inflation factor of the self-similarity of n is the positive root of the polynomial x2-nx-1. This root is sometimes called the n-th metallic mean, and in particular, the golden mean when n=1, and the silver mean when n=2. When n=1, the set of Wang tiles T1 is equivalent to the Ammann aperiodic set of 16 Wang tiles.
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