Gady Kozma, Asaf Nachmias
Published 2009-09-24, updated 2009-11-16Version 2
In this note we study the geometry of the largest component C_1 of critical percolation on a finite graph G which satisfies the finite triangle condition, defined by Borgs et al. There it is shown that this component is of size n^{2/3}, and here we show that its diameter is n^{1/3} and that the simple random walk takes n steps to mix on it. Our results apply to critical percolation on several high-dimensional finite graphs such as the finite torus Z_n^d (with d large and n tending to infinity) and the Hamming cube {0,1}^n.
Quenched invariance principle for simple random walk on percolation clusters
Type transition of simple random walks on randomly directed regular lattices
Critical percolation on any quasi-transitive graph of exponential growth has no infinite clusters
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