English

Hexagonal and trigonal quasiperiodic tilings

Soft Condensed Matter 2025-07-30 v2

Abstract

Exploring nonminimal-rank quasicrystals, which have symmetries that can be found in both periodic and aperiodic crystals, often provides new insight into the physical nature of aperiodic long-range order in models that are easier to treat. Motivated by the prevalence of experimental systems exhibiting aperiodic long-range order with hexagonal and trigonal symmetry, we introduce a generic two-parameter family of 2-dimensional quasiperiodic tilings with such symmetries. We focus on the special case of trigonal and hexagonal Fibonacci, or golden-mean, tilings, analogous to the well studied square Fibonacci tiling. We first generate the tilings using a generalized version of de Bruijn's dual grid method. We then discuss their interpretation in terms of projections of a hypercubic lattice from six dimensional superspace. We conclude by concentrating on two of the hexagonal members of the family, and examining a few of their properties more closely, while providing a set of substitution rules for their generation.

Keywords

Cite

@article{arxiv.2201.11848,
  title  = {Hexagonal and trigonal quasiperiodic tilings},
  author = {Sam Coates and Akihisa Koga and Toranosuke Matsubara and Ryuji Tamura and Hem Raj Sharma and Ronan McGrath and Ron Lifshitz},
  journal= {arXiv preprint arXiv:2201.11848},
  year   = {2025}
}

Comments

Version 2 is greatly expanded and generalized, giving a broader context for golden-mean (and other irrational value) tilings, and providing many technical details that were missing

R2 v1 2026-06-24T09:06:27.742Z