Quenched Survival of Bernoulli Percolation on Galton-Watson Trees

Abstract

We explore the survival function for percolation on Galton-Watson trees. Letting g(T,p) represent the probability a tree T survives Bernoulli percolation with parameter p, we establish several results about the behavior of the random function g(T , ·), where T is drawn from the Galton-Watson distribution. These include almost sure smoothness in the supercritical region; an expression for the kth-order Taylor expansion of g(T , ·) at criticality in terms of limits of martingales defined from T (this requires a moment condition depending on k); and a proof that the kth order derivative extends continuously to the critical value. Each of these results is shown to hold for almost every Galton-Watson tree.