Edge Clique Cover of Claw-free Graphs

Abstract

The smallest number of cliques, covering all edges of a graph G , is called the (edge) clique cover number of G and is denoted by cc(G) . It is an easy observation that for every line graph G with n vertices, cc(G)≤ n . G. Chen et al. [Discrete Math. 219 (2000), no. 1--3, 17--26; MR1761707] extended this observation to all quasi-line graphs and questioned if the same assertion holds for all claw-free graphs. In this paper, using the celebrated structure theorem of claw-free graphs due to Chudnovsky and Seymour, we give an affirmative answer to this question for all claw-free graphs with independence number at least three. In particular, we prove that if G is a connected claw-free graph on n vertices with α(G)≥ 3 , then cc(G)≤ n and equality holds if and only if G is either the graph of icosahedron, or the complement of a graph on 10 vertices called twister or the pth power of the cycle Cn , for 1≤ p ≤ (n-1)/3 .