The Size of the Giant Joint Component in a Binomial Random Double Graph

Abstract

We study the joint components in a random `double graph' that is obtained by superposing red and blue binomial random graphs on n~vertices. A joint component is a maximal set of vertices, which contains both a red and a blue spanning tree. We show that there are critical pairs of red and blue edge densities at which a joint-giant component appears. In contrast to the standard binomial graph model, the phase transition is first order: the size of the largest joint component jumps from O(1) vertices to (n) at the critical point. We connect this phenomenon to the properties of a certain bicoloured branching process.