Two-stage Bootstrap Percolation
Abstract
We introduce and study two variants of two-stage growth dynamics in with state space . In each variant, vertices in state can be changed irreversibly to state , and vertices in state can be changed permanently to state . In the standard variant, a vertex flips from state to if it has at least two nearest-neighbors in state . In the modified variant, a changes to a if it has both a north or south neighbor and an east or west neighbor in state , and a changes to a if it has at least two nearest-neighbors in state . We assume that the initial configuration is given by a product measure with small probabilities and of s and s. For both variants, as and tend to , if is large compared to , then the final density of s tends to . When is small compared to , for standard variant the final density of s tends to , while for the modified variant the final density of s tends to . In fact, for the modified variant, the final density of s approaches regardless of the relative size of versus . These results remain unchanged if, in either variant, a changes to a only if it has both a north or south neighbor and an east or west neighbor in state . An essential feature of these dynamics is that they are not monotone in the initial configuration.
Keywords
Cite
@article{arxiv.2509.16541,
title = {Two-stage Bootstrap Percolation},
author = {Zihao Fang and Janko Gravner and David Sivakoff},
journal= {arXiv preprint arXiv:2509.16541},
year = {2025}
}