Symmetry (Oct 2012)

Hexagonal Inflation Tilings and Planar Monotiles

  • Michael Baake,
  • Franz Gähler,
  • Uwe Grimm

DOI
https://doi.org/10.3390/sym4040581
Journal volume & issue
Vol. 4, no. 4
pp. 581 – 602

Abstract

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Aperiodic tilings with a small number of prototiles are of particular interest, both theoretically and for applications in crystallography. In this direction, many people have tried to construct aperiodic tilings that are built from a single prototile with nearest neighbour matching rules, which is then called a monotile. One strand of the search for a planar monotile has focused on hexagonal analogues of Wang tiles. This led to two inflation tilings with interesting structural details. Both possess aperiodic local rules that define hulls with a model set structure. We review them in comparison, and clarify their relation with the classic half-hex tiling. In particular, we formulate various known results in a more comparative way, and augment them with some new results on the geometry and the topology of the underlying tiling spaces.

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