English

Efficient algorithm for simulating particles in real quasiperiodic environments

Chaotic Dynamics 2022-04-28 v2 Computational Physics

Abstract

We introduce an algorithm based on Generalized Dual Method (GDM) to efficiently study the dynamics of a particle in quasiperiodic environments without the need to use periodic approximations or to save the information of the vertices that make up the quasiperiodic lattice. We show that the computation time and the memory required to find the tile in which a particle is located as a function of the distance RR to the center of symmetry remains constant in our algorithm, while using the GDM directly both quantities go like R2R^2.This allows us to perform realistic simulations with low consumption of computational resources. The algorithm can be used to study any quasiperiodic lattice that can be produced by the cut-and-project method. Using this algorithm, we have calculated the free path length distribution in quasiperiodic Lorentz gases reproducing previous results and for systems with high symmetries at the Boltzmann-Grad limit. We have found for the Boltzmann-Grad limit, that the distribution of free paths depends on the rank rr of the quasiperiodic system and not on its symmetry. The distribution as a function of the free path length ll appears to be a combination of exponential decay and a power-law behavior. The latter seems to become important only for probabilities less than (2r2r(r+1))1(2^{r-2} r (r+1))^{-1}, showing an exponential decaying free-path length distribution for rr \rightarrow \infty, similar to what is observed in disordered systems.

Keywords

Cite

@article{arxiv.2111.08128,
  title  = {Efficient algorithm for simulating particles in real quasiperiodic environments},
  author = {Alan Rodrigo Mendoza Sosa and Atahualpa S. Kraemer},
  journal= {arXiv preprint arXiv:2111.08128},
  year   = {2022}
}

Comments

16 pages, 9 figures, paper for the algorithm in https://github.com/AlanRodrigoMendozaSosa/Quasiperiodic-Tiles

R2 v1 2026-06-24T07:39:44.384Z