English

Ising model on the aperiodic Smith hat

Statistical Mechanics 2025-03-07 v2

Abstract

Smith et al discovered an aperiodic monotile of 13-sided shape in 2023. It is called the `Smith hat' and consists of 8 kites. We deal with the statistical physics of the lattice of the kites, which we call the `Smith-kite lattice'. We studied the Ising model on the aperiodic Smith-kite lattice and the dual Smith-kite lattice using Monte Carlo simulations. We combined the Swendsen-Wang multi-cluster algorithm and the replica exchange method. We simulated systems up to the total spin number 939201939201. Using the finite-size scaling analysis, we estimated the critical temperature on the Smith-kite lattice as Tc/J=2.405±0.0005T_c/J=2.405 \pm 0.0005 and that of the dual Smith-kite lattice as Tc/J=2.143±0.0005T^{*}_{c}/J=2.143 \pm 0.0005. Moreover, we confirmed the duality relation between the critical temperatures on the dual pair of aperiodic lattices, sinh(2J/Tc)sinh(2J/Tc)=1.000±0.001\sinh(2J/T_c) \sinh(2J/T^{*}_{c}) = 1.000 \pm 0.001. We also checked the duality relation for the nearest-neighbor correlation at the critical temperature, essentially the energy, ϵ(Tc)/coth(2J/Tc)+ϵ(Tc)/coth(2J/Tc)=1.000±0.001\epsilon(T_c)/\coth(2J/T_c) + \epsilon(T^{*}_c)/\coth(2J/T^{*}_c) = 1.000 \pm 0.001.

Keywords

Cite

@article{arxiv.2402.11331,
  title  = {Ising model on the aperiodic Smith hat},
  author = {Yutaka Okabe and Komajiro Niizeki and Yoshiaki Araki},
  journal= {arXiv preprint arXiv:2402.11331},
  year   = {2025}
}

Comments

accepted publication in J. Phys. A

R2 v1 2026-06-28T14:51:52.599Z