Flat quasicrystalline tilings in terms of density wave approach

TL;DR

This paper uses a density wave approach within Landau theory to derive flat quasicrystalline tilings, revealing new structures and assembly methods for decagonal and dodecagonal quasicrystals, including minimal-defect tilings.

Contribution

The paper introduces a novel method for generating flat quasicrystalline tilings using interference pattern extrema within Landau theory, including previously unidentified structures.

Findings

Derived constraints on critical wave phases for quasicrystal tilings

Identified new dodecagonal tiling with regular dodecagons and deformed pentagons

Developed a nonequilibrium assembly approach for defect-minimized tilings

Abstract

Classical Landau theory considers structural phase transitions and crystallization as a condensation of several critical density waves whose wave vectors are symmetrically equivalent. Analyzing the simplest nonequilibrium Landau potentials obtained for decagonal and dodecagonal cases, we derive constraints on the phases of the critical waves and deduce two pairs of flat tilings that are the simplest from the viewpoint of our theory. Each pair corresponds to the same irreducible interference pattern: the vertices of the first and second tilings are located at its minima and maxima, respectively. The first decagonal pair consists of the Penrose P1 tiling and the Tie and Navette one. The second pair is represented by dodecagonal tiling of squares, triangles, and shields, and previously unidentified one formed by regular dodecagons and identical deformed pentagons. Surprisingly, the proposed method for finding extrema of interference patterns provides a straightforward way to generate the Penrose tiling P3 and its more complicated analogues with 2n-fold symmetries. Within Landau theory, we discuss the assembly of the square-triangular tiling and its relationship with the dodecagonal tiling that includes shields. Then we develop a nonequilibrium assembly approach that is based on Landau theory and allows us to produce tilings with random phason strain characteristic of quasicrystals. Interestingly, the approach can generate tilings without or with a minimum number of defective tiles. Examples of real systems rationalized within Landau theory are considered as well. Finally, the derivation of other tilings arising from the reducible interference patterns is discussed, and the relative complexity of non-phenomenological interactions required for the assembly of decagonal and dodecagonal structures is analyzed.