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2010

A hierarchical strongly aperiodic set of tiles in the hyperbolic plane

13 years 10 months ago
A hierarchical strongly aperiodic set of tiles in the hyperbolic plane
We give a new construction of strongly aperiodic set of tiles in H2 , exhibiting a kind of hierarchical structure, simplifying the central framework of Margenstern’s proof that the Domino problem is undecidable in the hyperbolic plane [13]. Ludwig Danzer once asked whether, in the hyperbolic plane, where there are no similarities, there could be any notion of hierarchical tiling—an idea which plays a great role in many constructions of aperiodic sets of tiles in the Euclidean plane [1, 2, 4, 5, 6, 15, 17, 18]. It is an honor to dedicate this paper, which exposes a way to look at this question, to Herr Prof. Danzer in his 80th year. In 1966, R. Berger proved that the Domino Problem— whether a given set of tiles admits a tiling— is undecidable in the Euclidean plane, hanging his proof on the construction of an aperiodic set of tiles [2]. This first set was quite complex, with over 20,000 tiles; Berger himself reduced this to 104 [3] and in 1971, R. Robinson streamlined Berger’...
Chaim Goodman-Strauss
Added 30 Jan 2011
Updated 30 Jan 2011
Type Journal
Year 2010
Where TCS
Authors Chaim Goodman-Strauss
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