Smallest percolating sets in bootstrap percolation on grids
Abstract
In this paper we fill in a fundamental gap in the extremal bootstrap percolation literature, by providing the first proof of the fact that for all d ≥ 1, the size of the smallest percolating sets in d-neighbour bootstrap percolation on [n]d, the d-dimensional grid of size n, is nd-1. Additionally, we prove that such sets percolate in time at most cd n2, for some constant cd >0 depending on d only.
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