Slightly supercritical percolation on nonamenable graphs II: Growth and isoperimetry of infinite clusters
Abstract
We study the growth and isoperimetry of infinite clusters in slightly supercritical Bernoulli bond percolation on transitive nonamenable graphs under the L2 boundedness condition (pc<p2 2). Surprisingly, we find that the volume growth of infinite clusters is always purely exponential (that is, the subexponential corrections to growth are bounded) in the regime pc<p<p2 2, even when the ambient graph has unbounded corrections to exponential growth. For p slightly larger than pc, we establish the precise estimates align* Ep [ \# Bint(v,r) ] & (r 1p-pc )2 eγint(p) r \\ Ep [ \# Bint(v,r) v ∞ ] & (r 1p-pc )2 eγint(p) r align* for every v∈ V, r ≥ 0, and pc < p ≤ pc+δ, where the growth rate γint(p) = 1r Ep\#B(v,r) satisfies γint(p) p-pc. We also prove a percolation analogue of the Kesten-Stigum theorem that holds in the entire supercritical regime and states that the quenched and annealed exponential growth rates of an infinite cluster always coincide. We apply these results together with those of the first paper in this series to prove that the anchored Cheeger constant of every infinite cluster K satisfies \[ (p-pc)2[1/(p-pc)] *(K) (p-pc)2 \] almost surely for every pc<p≤1.
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