An edge of a graph is called critical, if deleting it the stability number of the graph increases, and a nonedge is called co-critical, if adding it to the graph the size of the maximum clique increases. We prove in this paper, that the minimal imperfect graphs containing certain configurations of two critical edges and one co-critical nonedge are exactly the odd holes or antiholes. Then we deduce some reformulations of the strong perfect graph conjecture and prove its validity for some particular cases. Among the consequences we prove that the existence in every minimal imperfect graph G of a maximum clique Q, for which G - Q has one unique optimal coloration. is equivalent to the strong perfect graph conjecture, as well as the existence of a vertex v in V(G) such that the (uniquely colorable) perfect graph G-v has a ''combinatorially forced'' color class. These statements contain earlier results involving more critical edges, of Markossian, Gasparian and Markossian, and those of Bacsoi and they also imply that a class of partitionable graphs constructed by Chvatal, Graham, Perold, and Whitesides does not contain counterexamples to the strong perfect graph conjecture. (C) 1996 Academic Press, Inc. [References: 25]
展开▼
