Monochromatic Subgraphs in Randomly Colored Dense Multiplex Networks

Abstract

Given a sequence of graphs Gn and a fixed graph H, denote by T(H, Gn) the number of monochromatic copies of the graph H in a uniformly random c-coloring of the vertices of Gn. In this paper we study the joint distribution of a finite collection of monochromatic graph counts in networks with multiple layers (multiplex networks). Specifically, given a finite collection of graphs H1, H2, …, Hd we derive the joint distribution of (T(H1, Gn(1)), T(H2, Gn(2)), …, T(Hd, Gn(d))), where Gn = (Gn(1), Gn(2), …, Gn(d)) is a collection of dense graphs on the same vertex set converging in the joint cut-metric. The limiting distribution is the sum of 2 independent components: a multivariate Gaussian and a sum of independent bivariate stochastic integrals. This extends previous results on the marginal convergence of monochromatic subgraphs in a sequence of graphs to the joint convergence of a finite collection of monochromatic subgraphs in a sequence of multiplex networks. Several applications and examples are discussed.