Limit Theorems for Monochromatic Stars

Abstract

Let T(K1, r, Gn) be the number of monochromatic copies of the r-star K1, r in a uniformly random coloring of the vertices of the graph Gn. In this paper we provide a complete characterization of the limiting distribution of T(K1, r, Gn), in the regime where E(T(K1, r, Gn)) is bounded, for any growing sequence of graphs Gn. The asymptotic distribution is a sum of mutually independent components, each term of which is a polynomial of a single Poisson random variable of degree at most r. Conversely, any limiting distribution of T(K1, r, Gn) has a representation of this form. Examples and connections to the birthday problem are discussed.