International audienceThe 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 first of these three approaches yielded the first (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 signicant part of it to the 'primitive graphs and structural faults' paradigm which led to the Strong Perfect Graph Theorem (SPGT); (2) we briefly present the other "direct" attempts, ...
AbstractA graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals ...
AbstractWhen α, ω are positive integers, we set n = αω + 1 and look for zero-one matrices X, Y of si...
The partition number θ of a graph G is the minimum number of cliques which cover the points of G. Th...
AbstractThe Strong Perfect Graph Conjecture (SPGC) was certainly one of the most challenging conject...
In 1961, Claude Berge proposed the \strong perfect graph conjecture", probably the most beautif...
A graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals the larg...
In 1961, Claude Berge proposed the “strong perfect graph conjecture”, probably the most beautiful op...
AbstractA graph is perfect if for each of its induced subgraphs H, the chromatic number of H is equa...
Perfect graphs were defined by Claude Berge in the 1960s. They are important objects for graph theor...
介绍强完美图定理(The Strong Perfect Graph Theorem,SPGT)的历史和获证经过,同时简述SPGT被克服后生发的一些新问题,以期对图理论的一般研究起到鼓励和促进作用.因具...
The Strong Perfect Graph Conjecture of Claude Berge is now nearly 25 years old. Efforts to resolve t...
AbstractPerfect Graphs were defined by Claude Berge in 1961. Since that time this class of graphs ha...
AbstractIn this paper we prove the validity of the Strong Perfect Graph Conjecture for some classes ...
AbstractPartitionable graphs have been studied by a number of authors in conjunction with attempts a...
AbstractThis paper presents an algorithmic proof of the validity of the Strong Perfect Graph Conject...
AbstractA graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals ...
AbstractWhen α, ω are positive integers, we set n = αω + 1 and look for zero-one matrices X, Y of si...
The partition number θ of a graph G is the minimum number of cliques which cover the points of G. Th...
AbstractThe Strong Perfect Graph Conjecture (SPGC) was certainly one of the most challenging conject...
In 1961, Claude Berge proposed the \strong perfect graph conjecture", probably the most beautif...
A graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals the larg...
In 1961, Claude Berge proposed the “strong perfect graph conjecture”, probably the most beautiful op...
AbstractA graph is perfect if for each of its induced subgraphs H, the chromatic number of H is equa...
Perfect graphs were defined by Claude Berge in the 1960s. They are important objects for graph theor...
介绍强完美图定理(The Strong Perfect Graph Theorem,SPGT)的历史和获证经过,同时简述SPGT被克服后生发的一些新问题,以期对图理论的一般研究起到鼓励和促进作用.因具...
The Strong Perfect Graph Conjecture of Claude Berge is now nearly 25 years old. Efforts to resolve t...
AbstractPerfect Graphs were defined by Claude Berge in 1961. Since that time this class of graphs ha...
AbstractIn this paper we prove the validity of the Strong Perfect Graph Conjecture for some classes ...
AbstractPartitionable graphs have been studied by a number of authors in conjunction with attempts a...
AbstractThis paper presents an algorithmic proof of the validity of the Strong Perfect Graph Conject...
AbstractA graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals ...
AbstractWhen α, ω are positive integers, we set n = αω + 1 and look for zero-one matrices X, Y of si...
The partition number θ of a graph G is the minimum number of cliques which cover the points of G. Th...