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Isoperimetry in supercritical bond percolation in dimensions three and higher

Published 17 Feb 2016 in math.PR | (1602.05598v2)

Abstract: We study the isoperimetric subgraphs of the infinite cluster $\textbf{C}\infty$ for supercritical bond percolation on $\mathbb{Z}d$ with $d\geq 3$. Specifically, we consider the subgraphs of $\textbf{C}\infty \cap [-n,n]d$ which have minimal open edge boundary to volume ratio. We prove a shape theorem for these subgraphs, obtaining that when suitably rescaled, these subgraphs converge almost surely to a translate of a deterministic shape. This deterministic shape is itself an isoperimetric set for a norm we construct. As a corollary, we obtain sharp asymptotics on a natural modification of the Cheeger constant for $\textbf{C}_\infty \cap [-n,n]d$. This settles a conjecture of Benjamini for the version of the Cheeger constant defined here.

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