Slightly supercritical percolation on nonamenable graphs I: The distribution of finite clusters

Abstract

We study the distribution of finite clusters in slightly supercritical (p pc) Bernoulli bond percolation on transitive nonamenable graphs, proving in particular that if G is a transitive nonamenable graph satisfying the L2 boundedness condition (pc<p2 2) and K denotes the cluster of the origin then there exists δ>0 such that Pp(n ≤ |K| < ∞) n-1/2 [ - ( |p-pc|2 n) ] and \[ Pp(r ≤ Rad(K) < ∞) r-1 [ - ( |p-pc| r) ] \] for every p∈ (pc-δ,pc+δ) and n,r≥ 1, where all implicit constants depend only on G. We deduce in particular that the critical exponents γ' and ' describing the rate of growth of the moments of a finite cluster as p pc take their mean-field values of 1 and 2 respectively. These results apply in particular to Cayley graphs of nonelementary hyperbolic groups, to products with trees, and to transitive graphs of spectral radius <1/2. In particular, every finitely generated nonamenable group has a Cayley graph to which these results apply. They are new for graphs that are not trees. The corresponding facts are yet to be understood on Zd even for d very large. In a second paper in this series, we will apply these results to study the geometric and spectral properties of infinite slightly supercritical clusters in the same setting.