The second largest component in the supercritical 2D Hamming graph

Abstract

The 2-dimensional Hamming graph H(2,n) consists of the n2 vertices (i,j), 1≤ i,j≤ n, two vertices being adjacent when they share a common coordinate. We examine random subgraphs of H(2,n) in percolation with edge probability p, so that the average degree 2(n-1)p=1+ε. Previous work by van der Hofstad and Luczak had shown that in the barely supercritical region n-2/31/3n ε 1 the largest component has size 2ε n. Here we show that the second largest component has size close to ε-2, so that the dominant component has emerged. This result also suggests that a discrete duality principle might hold, whereby, after removing the largest connected component in the supercritical regime, the remaining random subgraphs behave as in the subcritical regime.