Paul Seymour scite author profile

A graph G is perfect if for every induced subgraph H, the chromatic number of H equals the size of the largest complete subgraph of H, and G is Berge if no induced subgraph of G is an odd cycle of length at least five or the complement of one.The "strong perfect graph conjecture" (Berge, 1961) asserts that a graph is perfect if and only if it is Berge. A stronger conjecture was made recently by Conforti, Cornuéjols and Vušković -that every Berge graph either falls into one of a few basic classes, or admits one of a few kinds of separation (designed so that a minimum counterexample to Berge's conjecture cannot have either of these properties).In this paper we prove both of these conjectures.

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Graph Minors .XIII. The Disjoint Paths Problem

Robertson

Seymour

1995

Journal of Combinatorial Theory, Series B

1,053

905

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Graph minors. II. Algorithmic aspects of tree-width

Robertson

Seymour

1986

Journal of Algorithms

1,340

764

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Graph minors. X. Obstructions to tree-decomposition

Robertson

Seymour²

1991

Journal of Combinatorial Theory, Series B

590

668

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Graph minors. V. Excluding a planar graph

Robertson

Seymour

1986

Journal of Combinatorial Theory, Series B

680

554

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Paul Seymour

The strong perfect graph theorem

Graph Minors .XIII. The Disjoint Paths Problem

Graph minors. II. Algorithmic aspects of tree-width

Graph minors. X. Obstructions to tree-decomposition

Graph minors. V. Excluding a planar graph

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