A random coloring process gives improved bounds for the Erdos-Gy\'arf\'as problem on generalized Ramsey numbers

Abstract

The Erdos-Gy\'arf\'as number f(n, p, q) is the smallest number of colors needed to color the edges of the complete graph Kn so that all of its p-clique spans at least q colors. In this paper we improve the best known upper bound on f(n, p, q) for many fixed values of p, q and large n. Our proof uses a randomized coloring process, which we analyze using the so-called differential equation method to establish dynamic concentration.

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