Large monochromatic components in almost complete graphs and bipartite graphs

Abstract

Gy\'arfas proved that every coloring of the edges of Kn with t+1 colors contains a monochromatic connected component of size at least n/t. Later, Gy\'arf\'as and S\'ark\"ozy asked for which values of γ=γ(t) does the following strengthening for almost complete graphs hold: if G is an n-vertex graph with minimum degree at least (1-γ)n, then every (t+1)-edge coloring of G contains a monochromatic component of size at least n/t. We show γ = 1/(6t3) suffices, improving a result of DeBiasio, Krueger, and S\'ark\"ozy.