A fourth moment phenomenon for asymptotic normality of monochromatic subgraphs
Abstract
Given a graph sequence \Gn\n1 and a simple connected subgraph H, we denote by T(H,Gn) the number of monochromatic copies of H in a uniformly random vertex coloring of Gn with c 2 colors. In this article, we prove a central limit theorem for T(H,Gn) with explicit error rates. The error rates arise from graph counts of collections formed by joining copies of H that we call good joins. Counts of good joins are closely related to the fourth moment of a normalized version of T(H,Gn), and that connection allows us to show a fourth moment phenomenon for the central limit theorem. Precisely, for c 30, we show that T(H,Gn) (appropriately centered and rescaled) converges in distribution to N(0,1) whenever its fourth moment converges to 3 (the fourth moment of the standard normal distribution). We show the convergence of the fourth moment is necessary to obtain a normal limit when c 2. The combination of these results implies that the fourth moment condition characterizes the limiting normal distribution of T(H,Gn) for all subgraphs H, whenever c 30.
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