The Strong Perfect Graph Conjecture: 40 years of attempts, and its resolution

The Strong Perfect Graph Conjecture (SPGC) was certainly one of the most challenging conjectures in graph theory. During more than four decades, numerous attempts were made to solve it, by combinatorial methods, by linear algebraic methods, or by polyhedral methods. The rst of these three approaches yielded the rst (and to date only) proof of the SPGC; the other two remain promising to consider in attempting an alternative proof. This paper is an unbalanced survey of the attempts to solve the SPGC; unbalanced, because (1) we devote a signi cant part of it to the `primitive graphs and structural faults' paradigm which led to the Strong Perfect Graph Theorem (SPGT); (2) we brie y present the other direct attempts, that is, the ones for which results exist showing one (possible) way to the proof; (3) we ignore entirely the indirect approaches whose aim was to get more information about the properties and structure of perfect graphs, without a direct impact on the SPGC. Our aim in this paper is to trace the path that led to the proof of the SPGT as completely as possible. Of course, this implies large overlaps with the recent book on perfect graphs [81], but it also implies a deeper analysis (with additional results) and another viewpoint on the topic.