An Improved Upper Bound for Bootstrap Percolation in All Dimensions

Abstract

In r-neighbor bootstrap percolation on the vertex set of a graph G, a set A of initially infected vertices spreads by infecting, at each time step, all uninfected vertices with at least r previously infected neighbors. When the elements of A are chosen independently with some probability p, it is natural to study the critical probability pc(G,r) at which it becomes likely that all of V(G) will eventually become infected. Improving a result of Balogh, Bollob\'as, and Morris, we give a bound on the second term in the expansion of the critical probability when G = [n]d and d ≥ r ≥ 2. We show that for all d ≥ r ≥ 2 there exists a constant cd,r > 0 such that if n is sufficiently large, then \[ pc([n]d, r) ≤ (λ(d,r)(r-1)(n) - cd,r((r-1)(n))3/2)d-r+1, \] where λ(d,r) is an exact constant and (k)(n) denotes the k-times iterated natural logarithm of n.