On the chromatic number of some (P3 P2)-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)) denotes the chromatic (clique) number of G. It is known that for every (P3 P2)-free graph G, (G) 16ω(G)(ω(G)+1)(ω(G)+2) BA18, and the class of (2K2, 3K1)-free graphs does not admit a linear -binding functionBBS19. In this paper, we prove that ( 1) (G)2ω(G) if G is (P3 P2, kite)-free, ( 2) (G)ω2(G) if G is (P3 P2, hammer)-free, ( 3) (G)3ω2(G)+ω(G)2 if G is (P3 P2, C5)-free. Furthermore, we also discuss -binding functions for (P3 P2, K4)-free graphs.