A rainbow connectivity threshold for random graph families

Abstract

Given a family G of graphs on a common vertex set X, we say that G is rainbow connected if for every vertex pair u,v ∈ X, there exists a path from u to v that uses at most one edge from each graph in G. We consider the case that G contains s graphs, each sampled randomly from G(n,p), with n = |X| and p = c nsn, where c > 1 is a constant. We show that when s is sufficiently large, G is a.a.s. rainbow connected, and when s is sufficiently small, G is a.a.s. not rainbow connected. We also calculate a threshold of s for the rainbow connectivity of G, and we show that this threshold is concentrated on at most three values, which are larger than the diameter of the union of G by about n( n)2. The same results also hold in a more traditional random rainbow setting, where we take a random graph G∈ G(n,p) with p=c nn (c>1) and color each edge of G with a color chosen uniformly at random from the set [s] of s colors.