A universal dichotomy for concentration in randomly colored graphs

Abstract

Let ζ be Euclidean norm of the degree sequence of a graph normalized by the graph size. We prove that when the vertices of a graph are randomly colored with s colors such that the fraction of vertices in each color class is bounded away from zero, only two asymptotic regimes emerge. If ζ=o(1), then the sizes of the subgraphs induced by the color classes concentrate around their expected values. If ζ=Θ(1), then concentration depends on the color balance: for colorings with persisting imbalance, the total number M of monochromatic edges stays bounded away from its mean with positive probability; otherwise, for vanishing imbalance, M still concentrates. The same dichotomy holds for a broad class of randomly colored random graphs.