English

A modified bootstrap percolation on a random graph coupled with a lattice

Combinatorics 2018-12-18 v3 Probability

Abstract

In this paper a random graph model GZN2,pdG_{\mathbb{Z}^2_N,p_d} is introduced, which is a combination of fixed torus grid edges in (Z/NZ)2(\mathbb{Z}/N \mathbb{Z})^2 and some additional random ones. The random edges are called long, and the probability of having a long edge between vertices u,v(Z/NZ)2u,v\in(\mathbb{Z}/N \mathbb{Z})^2 with graph distance dd on the torus grid is pd=c/Ndp_d=c/Nd, where cc is some constant. We show that, {\em whp}, the diameter D(GZN2,pd)=Θ(logN)D(G_{\mathbb{Z}^2_N,p_d})=\Theta (\log N). Moreover, we consider non-monotonous bootstrap percolation on GZN2,pdG_{\mathbb{Z}^2_N,p_d}. We prove the presence of phase transitions in mean-field approximation and provide fairly sharp bounds on the error of the critical parameters. Our model addresses interesting mathematical questions of non-monotonous bootstrap percolation, and it is motivated by recent results of brain research.

Keywords

Cite

@article{arxiv.1507.07997,
  title  = {A modified bootstrap percolation on a random graph coupled with a lattice},
  author = {Svante Janson and Robert Kozma and Miklós Ruszinkó and Yury Sokolov},
  journal= {arXiv preprint arXiv:1507.07997},
  year   = {2018}
}

Comments

The updated version includes several improvements, including the analysis of the process and its mean field approximation for a larger range of threshold values. Some open problems are added and the paper has a better readability

R2 v1 2026-06-22T10:21:09.551Z