Slow graph bootstrap percolation III: Chain constructions
Abstract
For graphs , we study the extremal function which is the maximum running time (until stabilisation) of an -bootstrap percolation process on vertices. Building on previous work in the clique case , we develop a general framework of chain constructions. We demonstrate the flexibility of this framework by applying several variations of the method to give lower bounds on for a wide variety of different graphs including dense graphs, random graphs and complete bipartite graphs. In particular, we focus on the question of whether is (almost) quadratic or not and our lower bounds develop connections with additive combinatorics, utilising constructions of sets free of solutions to certain linear equations. Finally, our lower bounds are complemented by upper bounds which connect to other problems in extremal graph theory such as the Ruzsa-Szemer\'edi (6,3)-Theorem.
Keywords
Cite
@article{arxiv.2508.03835,
title = {Slow graph bootstrap percolation III: Chain constructions},
author = {David Fabian and Patrick Morris and Tibor Szabó},
journal= {arXiv preprint arXiv:2508.03835},
year = {2025}
}
Comments
51 pages plus 5 pages of appendix, 3 figures