Two-stage Bootstrap Percolation

Abstract

We introduce and study two variants of two-stage growth dynamics in Z2 with state space \0,1,2\Z2. In each variant, vertices in state 0 can be changed irreversibly to state 1, and vertices in state 1 can be changed permanently to state 2. In the standard variant, a vertex flips from state i to i+1 if it has at least two nearest-neighbors in state i+1. In the modified variant, a 0 changes to a 1 if it has both a north or south neighbor and an east or west neighbor in state 1, and a 1 changes to a 2 if it has at least two nearest-neighbors in state 2. We assume that the initial configuration is given by a product measure with small probabilities p and q of 1s and 2s. For both variants, as p and q tend to 0, if q is large compared to p2+o(1), then the final density of 0s tends to 1. When q is small compared to p2+o(1), for standard variant the final density of 2s tends to 1, while for the modified variant the final density of 1s tends to 1. In fact, for the modified variant, the final density of 2s approaches 0 regardless of the relative size of q versus p. These results remain unchanged if, in either variant, a 1 changes to a 2 only if it has both a north or south neighbor and an east or west neighbor in state 2. An essential feature of these dynamics is that they are not monotone in the initial configuration.