| Abstract: | Given a graph sequence  denote by T3(Gn) the number of monochromatic triangles in a uniformly random coloring of the vertices of Gn with  colors. In this paper we prove a central limit theorem (CLT) for T3(Gn) with explicit error rates, using a quantitative version of the martingale CLT. We then relate this error term to the well-known fourth-moment phenomenon, which, interestingly, holds only when the number of colors satisfies  . We also show that the convergence of the fourth moment is necessary to obtain a Gaussian limit for any  , which, together with the above result, implies that the fourth-moment condition characterizes the limiting normal distribution of T3(Gn), whenever  . Finally, to illustrate the promise of our approach, we include an alternative proof of the CLT for the number of monochromatic edges, which provides quantitative rates for the results obtained in 7]. |
