Thresholds for contagious sets in random graphs

Abstract

For fixed r≥ 2, we consider bootstrap percolation with threshold r on the Erdos-R\'enyi graph Gn,p. We identify a threshold for p above which there is with high probability a set of size r which can infect the entire graph. This improves a result of Feige, Krivelevich and Reichman, which gives bounds for this threshold, up to multiplicative constants. As an application of our results, we also obtain an upper bound for the threshold for K4-bootstrap percolation on Gn,p, as studied by Balogh, Bollob\'as and Morris. We conjecture that our bound is asymptotically sharp. These thresholds are closely related to the survival probabilities of certain time-varying branching processes, and we derive asymptotic formulae for these survival probabilities which are of interest in their own right.