English

History-dependent percolation in two dimensions

Statistical Mechanics 2020-11-23 v2

Abstract

We study the history-dependent percolation in two dimensions, which evolves in generations from standard bond-percolation configurations through iteratively removing occupied bonds. Extensive simulations are performed for various generations on periodic square lattices up to side length L=4096L=4096. From finite-size scaling, we find that the model undergoes a continuous phase transition, which, for any finite number of generations, falls into the universality of standard 2D percolation. At the limit of infinite generation, we determine the correlation-length exponent 1/ν=0.828(5)1/\nu=0.828(5) and the fractal dimension df=1.8644(7)d_{\rm f}=1.864\,4(7), which are not equal to 1/ν=3/41/\nu=3/4 and df=91/48d_{\rm f}=91/48 for 2D percolation. Hence, the transition in the infinite-generation limit falls outside the standard percolation universality and differs from the discontinuous transition of history-dependent percolation on random networks. Further, a crossover phenomenon is observed between the two universalities in infinite and finite generations.

Keywords

Cite

@article{arxiv.2005.12035,
  title  = {History-dependent percolation in two dimensions},
  author = {Minghui Hu and Yanan Sun and Dali Wang and Jian-Ping Lv and Youjin Deng},
  journal= {arXiv preprint arXiv:2005.12035},
  year   = {2020}
}

Comments

9 pages, 11 figures

R2 v1 2026-06-23T15:47:12.254Z