Transitive closure in a polluted environment
Abstract
We introduce and study a new percolation model, inspired by recent works on jigsaw percolation, graph bootstrap percolation, and percolation in polluted environments. Start with an oriented graph of initially occupied edges on vertices, and iteratively occupy additional (oriented) edges by transitivity, with the constraint that only open edges in a certain random set can ever be occupied. All other edges are closed, creating a set of obstacles for the spread of occupied edges. When is an unoriented linear graph, and leftward and rightward edges are open independently with possibly different probabilities, we identify three regimes in which the set of eventually occupied edges is either all open edges, the majority of open edges in one direction, or only a very small proportion of all open edges. In the more general setting where is a connected unoriented graph of bounded degree, we show that the transition between sparse and full occupation of open edges occurs when the probability of open edges is . We conclude with several conjectures and open problems.
Cite
@article{arxiv.1910.01800,
title = {Transitive closure in a polluted environment},
author = {Janko Gravner and Brett Kolesnik},
journal= {arXiv preprint arXiv:1910.01800},
year = {2025}
}
Comments
v2: final version