On the Erd\"os-Lov\'asz Tihany Conjecture for Claw-Free Graphs

Abstract

In 1968, Erd\"os and Lov\'asz conjectured that for every graph G and all integers s,t≥ 2 such that s+t-1=(G) > ω(G), there exists a partition (S,T) of the vertex set of G such that (G|S)≥ s and (G|T)≥ t. For general graphs, the only settled cases of the conjecture are when s and t are small. Recently, the conjecture was proved for a few special classes of graphs: graphs with stability number 2 quasi-line, line graphs line and quasi-line graphs quasi-line. In this paper, we consider the conjecture for claw-free graphs and present some progress on it.