AbstractAn ordered graph is a graph whose vertices are positive integers. Two ordered graphs are isomorphic if the order-preserving bijection between their sets of vertices is a graph isomorphism. We identify the family of all sets S of ordered graphs with the following properties: (1) Each member of S is a P4 (defined as a chordless path with four vertices and three edges). (2) If an ordered graph Z has no induced subgraph isomorphic (as an ordered graph) to a member of S, then Z is perfect. This work is related to Berge's Strong Perfect Graph Conjecture and was motivated by Chvátal's theorem on perfectly orderable graphs
AbstractWe show that perfectly orderable graphs are quasi-parity graphs by exhibiting two nodes whic...
AbstractWe consider a construction which associated with a graph G another graph G′ such that if G′ ...
We investigate the following conjecture of Vašek Chvátal: any weakly triangulated graph containing n...
AbstractAn ordered graph is a graph whose vertices are positive integers. Two ordered graphs are iso...
AbstractThis paper generalizes previous works on perfectly orderable graphs by Olariu (Discrete Math...
AbstractWe present easily verifiable conditions, under which a graph G contains nonempty vertex-disj...
AbstractTwo graphs G and H with the same vertex set V are P4-isomorphic if there exists a permutatio...
AbstractWe establish a property of minimal nonperfectly orderable graphs, and use this property to g...
AbstractPerfect Graphs were defined by Claude Berge in 1961. Since that time this class of graphs ha...
AbstractIn a graph G = (V, E) provided with a linear order ‘ < ’ on V, a chordless path with vertice...
AbstractWe introduce a new class of perfectly orderable graphs that contains complements of chordal ...
AbstractAn undirected graph is called perfectly orderable if the set of its vertices admits a linear...
AbstractWe investigate the following conjecture of Vašek Chvátal: any weakly triangulated graph cont...
AbstractTwo graphs G and H with the same vertex set V are P4-isomorphic if there exists a permutatio...
AbstractWe prove that a graph is perfect if its vertices can be coloured by two colours in such a wa...
AbstractWe show that perfectly orderable graphs are quasi-parity graphs by exhibiting two nodes whic...
AbstractWe consider a construction which associated with a graph G another graph G′ such that if G′ ...
We investigate the following conjecture of Vašek Chvátal: any weakly triangulated graph containing n...
AbstractAn ordered graph is a graph whose vertices are positive integers. Two ordered graphs are iso...
AbstractThis paper generalizes previous works on perfectly orderable graphs by Olariu (Discrete Math...
AbstractWe present easily verifiable conditions, under which a graph G contains nonempty vertex-disj...
AbstractTwo graphs G and H with the same vertex set V are P4-isomorphic if there exists a permutatio...
AbstractWe establish a property of minimal nonperfectly orderable graphs, and use this property to g...
AbstractPerfect Graphs were defined by Claude Berge in 1961. Since that time this class of graphs ha...
AbstractIn a graph G = (V, E) provided with a linear order ‘ < ’ on V, a chordless path with vertice...
AbstractWe introduce a new class of perfectly orderable graphs that contains complements of chordal ...
AbstractAn undirected graph is called perfectly orderable if the set of its vertices admits a linear...
AbstractWe investigate the following conjecture of Vašek Chvátal: any weakly triangulated graph cont...
AbstractTwo graphs G and H with the same vertex set V are P4-isomorphic if there exists a permutatio...
AbstractWe prove that a graph is perfect if its vertices can be coloured by two colours in such a wa...
AbstractWe show that perfectly orderable graphs are quasi-parity graphs by exhibiting two nodes whic...
AbstractWe consider a construction which associated with a graph G another graph G′ such that if G′ ...
We investigate the following conjecture of Vašek Chvátal: any weakly triangulated graph containing n...