Poisson percolation on the square lattice

Abstract

On the square lattice raindrops fall on an edge with midpoint x at rate \|x\|∞-α. The edge becomes open when the first drop falls on it. Let (x,t) be the probability that the edge with midpoint x=(x1,x2) is open at time t and let n(p,t) be the distance at which edges are open with probability p at time t. We show that with probability tending to 1 as t ∞: (i) the cluster containing the origin C0(t) is contained in the square of radius n(pc-ε,t), and (ii) the cluster fills the square of radius n(pc+ε,t) with the density of points near x being close to θ((x,t)) where θ(p) is the percolation probability when bonds are open with probability p on Z2. Results of Nolin suggest that if N=n(pc,t) then the boundary fluctuations of C0(t) are of size N4/7.