English

Bootstrap percolation on the high-dimensional Hamming graph

Combinatorics 2024-06-21 v1 Probability

Abstract

In the random rr-neighbour bootstrap percolation process on a graph GG, a set of initially infected vertices is chosen at random by retaining each vertex of GG independently with probability p(0,1)p\in (0,1), and "healthy" vertices get infected in subsequent rounds if they have at least rr infected neighbours. A graph GG \emph{percolates} if every vertex becomes eventually infected. A central problem in this process is to determine the critical probability pc(G,r)p_c(G,r), at which the probability that GG percolates passes through one half. In this paper, we study random 22-neighbour bootstrap percolation on the nn-dimensional Hamming graph i=1nKk\square_{i=1}^n K_k, which is the graph obtained by taking the Cartesian product of nn copies of the complete graph KkK_k on kk vertices. We extend a result of Balogh and Bollob\'{a}s [Bootstrap percolation on the hypercube, Probab. Theory Related Fields. 134 (2006), no. 4, 624-648. MR2214907] about the asymptotic value of the critical probability pc(Qn,2)p_c(Q^n,2) for random 22-neighbour bootstrap percolation on the nn-dimensional hypercube Qn=i=1nK2Q^n=\square_{i=1}^n K_2 to the nn-dimensional Hamming graph i=1nKk\square_{i=1}^n K_k, determining the asymptotic value of pc(i=1nKk,2)p_c\left(\square_{i=1}^n K_k,2\right), up to multiplicative constants (when nn \rightarrow \infty), for arbitrary kNk \in \mathbb N satisfying 2k2n2 \leq k\leq 2^{\sqrt{n}}.

Keywords

Cite

@article{arxiv.2406.13341,
  title  = {Bootstrap percolation on the high-dimensional Hamming graph},
  author = {Mihyun Kang and Michael Missethan and Dominik Schmid},
  journal= {arXiv preprint arXiv:2406.13341},
  year   = {2024}
}
R2 v1 2026-06-28T17:11:45.352Z