Mean-field conditions for percolation on finite graphs

Abstract

Let Gn be a sequence of finite transitive graphs with vertex degree d=d(n) and |Gn|=n. Denote by pt(v,v) the return probability after t steps of the non-backtracking random walk on Gn. We show that if pt(v,v) has quasi-random properties, then critical bond-percolation on Gn has a scaling window of width n-1/3, as it would on a random graph. A consequence of our theorems is that if Gn is a transitive expander family with girth at least (2/3 + eps) d-1 n, then the size of the largest component in p-bond-percolation with p=1 +O(n-1/3) d-1 is roughly n2/3. In particular, bond-percolation on the celebrated Ramanujan graph constructed by Lubotzky, Phillips and Sarnak has the above scaling window. This provides the first examples of quasi-random graphs behaving like random graphs with respect to critical bond-percolation.