Chromatic bounds for some classes of 2K2-free graphs

Abstract

A hereditary class G of graphs is -bounded if there is a -binding function, say f such that (G) ≤ f(ω(G)), for every G ∈ G, where (G) (ω(G)) denote the chromatic (clique) number of G. It is known that for every 2K2-free graph G, (G) ≤ ω(G)+12, and the class of (2K2, 3K1)-free graphs does not admit a linear -binding function. In this paper, we are interested in classes of 2K2-free graphs that admit a linear -binding function. We show that the class of (2K2, H)-free graphs, where H∈ \K1+P4, K1+C4, P2 P3, HVN, K5-e, K5\ admits a linear -binding function. Also, we show that some superclasses of 2K2-free graphs are -bounded.