Connectivity Threshold for random subgraphs of the Hamming graph

Abstract

We study the connectivity of random subgraphs of the d-dimensional Hamming graph H(d, n), which is the Cartesian product of d complete graphs on n vertices. We sample the random subgraph with an i.i.d.\ Bernoulli bond percolation on H(d,n) with parameter p. We identify the window of the transition: when np- n - ∞ the probability that the graph is connected goes to 0, while when np- n + ∞ it converges to 1. We also investigate the connectivity probability inside the critical window, namely when np- n t ∈ R. We find that the threshold does not depend on d, unlike the phase transition of the giant connected component the Hamming graph (see [Bor et al, 2005]). Within the critical window, the connectivity probability does depend on d. We determine how.