中文

Finite size scaling in three-dimensional bootstrap percolation

统计力学 2007-05-23 v1

摘要

We consider the problem of bootstrap percolation on a three dimensional lattice and we study its finite size scaling behavior. Bootstrap percolation is an example of Cellular Automata defined on the dd-dimensional lattice {1,2,...,L}d\{1,2,...,L\}^d in which each site can be empty or occupied by a single particle; in the starting configuration each site is occupied with probability pp, occupied sites remain occupied for ever, while empty sites are occupied by a particle if at least \ell among their 2d2d nearest neighbor sites are occupied. When dd is fixed, the most interesting case is the one =d\ell=d: this is a sort of threshold, in the sense that the critical probability pcp_c for the dynamics on the infinite lattice Zd{\Bbb Z}^d switches from zero to one when this limit is crossed. Finite size effects in the three-dimensional case are already known in the cases 2\ell\le 2: in this paper we discuss the case =3\ell=3 and we show that the finite size scaling function for this problem is of the form f(L)=const/lnlnLf(L)={\mathrm{const}}/\ln\ln L. We prove a conjecture proposed by A.C.D. van Enter.

关键词

引用

@article{arxiv.cond-mat/9812077,
  title  = {Finite size scaling in three-dimensional bootstrap percolation},
  author = {Raphael Cerf and Emilio N. M. Cirillo},
  journal= {arXiv preprint arXiv:cond-mat/9812077},
  year   = {2007}
}

备注

18 pages, LaTeX file, no figure