On the maximum running time in graph bootstrap percolation
Abstract
Graph bootstrap percolation is a simple cellular automaton introduced by Bollob\'as in 1968. Given a graph and a set we initially "infect" all edges in and then, in consecutive steps, we infect every that completes a new infected copy of in . We say that percolates if eventually every edge in is infected. The extremal question about the size of the smallest percolating sets when was answered independently by Alon, Kalai and Frankl. Here we consider a different question raised more recently by Bollob\'as: what is the maximum time the process can run before it stabilizes? It is an easy observation that for this maximum is . However, a new phenomenon occurs for when, as we show, the maximum time of the process is . For the behaviour of the dynamics is even more complex, which we demonstrate by showing that the -bootstrap process can run for at least time steps for some that tends to as .
Cite
@article{arxiv.1510.07096,
title = {On the maximum running time in graph bootstrap percolation},
author = {Béla Bollobás and Michał Przykucki and Oliver Riordan and Julian Sahasrabudhe},
journal= {arXiv preprint arXiv:1510.07096},
year = {2017}
}