Expansion of percolation critical points for Hamming graphs

Abstract

The Hamming graph H(d,n) is the Cartesian product of d complete graphs on n vertices. Let m=d(n-1) be the degree and V = nd be the number of vertices of H(d,n). Let pc(d) be the critical point for bond percolation on H(d,n). We show that, for d ∈ N fixed and n ∞, equation* pc(d)= 1m + 2d2-12(d-1)21m2 + O(m-3) + O(m-1V-1/3), equation* which extends the asymptotics found in BorChaHofSlaSpe05b by one order. The term O(m-1V-1/3) is the width of the critical window. For d=4,5,6 we have m-3 = O(m-1V-1/3), and so the above formula represents the full asymptotic expansion of pc(d). In FedHofHolHul16a we show that this formula is a crucial ingredient in the study of critical bond percolation on H(d,n) for d=2,3,4. The proof uses a lace expansion for the upper bound and a novel comparison with a branching random walk for the lower bound. The proof of the lower bound also yields a refined asymptotics for the susceptibility of a subcritical Erdos-R\'enyi random graph.