English

Sharp Fuss-Catalan thresholds in graph bootstrap percolation

Probability 2025-12-11 v2 Combinatorics

Abstract

We study graph bootstrap percolation on the Erd\H{o}s-R\'enyi random graph Gn,p{\mathcal G}_{n,p}. For all r5r \ge 5, we locate the sharp KrK_r-percolation threshold pc(γn)1/λp_c \sim (\gamma n)^{-1/\lambda}, solving a problem of Balogh, Bollob\'as and Morris. The case r=3r=3 is the classical graph connectivity threshold, and the threshold for r=4r=4 was found using strong connections with the well-studied 22-neighbor dynamics from statistical physics. When r5r \ge 5, such connections break down, and the process exhibits much richer behavior. The constants λ=λ(r)\lambda=\lambda(r) and γ=γ(r)\gamma=\gamma(r) in pcp_c are determined by a class of ((r2)1)\left({r\choose2}-1\right)-ary tree-like graphs, which we call KrK_r-tree witness graphs. These graphs are associated with the most efficient ways of adding a new edge in the KrK_r-dynamics, and they can be counted using the Fuss-Catalan numbers. Also, in the subcritical setting, we determine the asymptotic number of edges added to Gn,p{\mathcal G}_{n,p}, showing that the edge density increases only by a constant factor, whose value we identify.

Keywords

Cite

@article{arxiv.2510.26724,
  title  = {Sharp Fuss-Catalan thresholds in graph bootstrap percolation},
  author = {Zsolt Bartha and Brett Kolesnik and Gal Kronenberg and Yuval Peled},
  journal= {arXiv preprint arXiv:2510.26724},
  year   = {2025}
}

Comments

v2: Corrected typos. Added references, more details in Sec. 6, and a new Fig. 3. Results unchanged

R2 v1 2026-07-01T07:14:14.960Z