On near optimal colorable graphs

Abstract

A class of graphs G is said to be near optimal colorable if there exists a constant c∈ N such that every graph G∈ G satisfies (G) ≤ \c, ω(G)\, where (G) and ω(G) respectively denote the chromatic number and clique number of G. The class of near optimal colorable graphs is an important subclass of the class of -bounded graphs which is well-studied in the literature. In this paper, we show that the class of (F, K4-e)-free graphs is near optimal colorable, where F∈ \P1+2P2,2P1+P3,3P1+P2\ and the graph K4-e is commonly referred as the diamond. This partially answers a question of Ju and Huang [Theoretical Computer Science 993 (2024) Article No.: 114465] and is related to a question of Schiermeyer (unpublished). Furthermore, using these results with some earlier known results, we also provide an alternate proof to the fact that the Chromatic Number problem for the class of (F, K4-e)-free graphs is solvable in polynomial time, where F∈ \P1+2P2,2P1+P3,3P1+P2\.