The Metastability Threshold for Modified Bootstrap Percolation in d Dimensions
Abstract
In the modified bootstrap percolation model, sites in the cube 1,...,Ld are initially declared active independently with probability p. At subsequent steps, an inactive site becomes active if it has at least one active nearest neighbour in each of the d dimensions, while an active site remains active forever. We study the probability that the entire cube is eventually active. For all d>=2 we prove that as L∞ and p 0 simultaneously, this probability converges to 1 if L=expd-1 (lambda+epsilon)/p, and converges to 0 if L=expd-1 (lambda-epsilon)/p, for any epsilon>0. Here expn denotes the n-th iterate of the exponential function, and the threshold lambda equals pi2/6 for all d.
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