The probability of unusually large components for critical percolation on random d-regular graphs
Abstract
Let d 3 be a fixed integer, p∈ (0,1), and let n≥ 1 be a positive integer such that dn is even. Let G(n, d, p) be a (random) graph on n vertices obtained by drawing uniformly at random a d-regular (simple) graph on [n] and then performing independent p-bond percolation on it, i.e. we independently retain each edge with probability p and delete it with probability 1-p. Let |Cmax| be the size of the largest component in G(n, d, p). We show that, when p is of the form p=(d-1)-1(1+λ n-1/3) for λ∈ R, and A is large, align* P(|Cmax|>An2/3) A-3/2e-A3(d-1)(d-2)8d2+λ A2(d-2)22d(d-1)-λ2 A(d-1)2(d-2). align* This improves on a result of Nachmias and Peres. We also give an analogous asymptotic for the probability that a particular vertex is in a component of size larger than An2/3.
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