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Bootstrap Percolation on the Binomial Random $k$-uniform Hypergraph

Probability 2024-03-20 v1

Abstract

We investigate the behaviour of rr-neighbourhood bootstrap percolation on the binomial kk-uniform random hypergraph Hk(n,p)H_k(n,p) for given integers k2k\geq 2 and r2r\geq 2. In rr-neighbourhood bootstrap percolation, infection spreads through the hypergraph, starting from a set of initially infected vertices, and in each subsequent step of the process every vertex with at least rr infected neighbours becomes infected. For our analysis the set of initially infected vertices is chosen uniformly at random from all sets of given size. In the regime n1nk2pn1/rn^{-1}\ll n^{k-2}p \ll n^{-1/r} we establish a threshold such that if the number of initially infected vertices remains below the threshold, then with high probability only a few additional vertices become infected, while if the number of initially infected vertices exceeds the threshold then with high probability almost every vertex becomes infected. In fact we show that the probability of failure decreases exponentially.

Keywords

Cite

@article{arxiv.2403.12775,
  title  = {Bootstrap Percolation on the Binomial Random $k$-uniform Hypergraph},
  author = {Mihyun Kang and Christoph Koch and Tamás Makai},
  journal= {arXiv preprint arXiv:2403.12775},
  year   = {2024}
}

Comments

32 pages 2 figures

R2 v1 2026-06-28T15:25:49.222Z