DOI<289::AID-JGT4>3.0.CO;2-3 10.1002/(SICI)1097-0118(199904)30:4<289::AID-JGT4>3.0.CO;2-3zbMath0920.05028OpenAlexW4252569207MaRDI QIDQ4238043
Cornuéjols, Gérard, Ajai Kapoor, Kristina Vušković, Michele Conforti
Publication date: 26 May 1999
Full work available at URL: https://doi.org/10.1002/(sici)1097-0118(199904)30:4<289::aid-jgt4>3.0.co;2-3
Negative (and positive) circles in signed graphs: a problem collection,
Triangulated neighborhoods in even-hole-free graphs,
Induced subgraphs and tree decompositions. I: Even-hole-free graphs of bounded degree,
Hereditary Efficiently Dominatable Graphs,
The (theta, wheel)-free graphs. I: Only-prism and only-pyramid graphs,
Solving the clique cover problem on (bull, \(C_4\))-free graphs,
Structure and algorithms for (cap, even hole)-free graphs,
Amalgams and χ-Boundedness,
Graphs of separability at most 2,
Graphs without odd holes, parachutes or proper wheels: A generalization of Meyniel graphs and of line graphs of bipartite graphs,
Decomposition techniques applied to the clique-stable set separation problem,
On the forbidden induced subgraph sandwich problem,
A note on chromatic number of (cap, even hole)-free graphs,
Unnamed Item,
Polynomial \(\chi \)-binding functions and forbidden induced subgraphs: a survey,
Graphs of Separability at Most Two: Structural Characterizations and Their Consequences,
A better upper bound on the chromatic number of (cap, even-hole)-free graphs,
Erdős-Hajnal for cap-free graphs,
Even-hole-free graphs part I: Decomposition theorem,
A structure theorem for graphs with no cycle with a unique chord and its consequences,
Recognition of quasi-Meyniel graphs,
Two classes of \(\beta \)-perfect graphs that do not necessarily have simplicial extremes,
Vertex elimination orderings for hereditary graph classes,
Stable sets and graphs with no even holes,
Even-hole-free graphs that do not contain diamonds: A structure theorem and its consequences,
Unnamed Item,
A faster algorithm to recognize even-hole-free graphs,
Even-hole-free graphs part II: Recognition algorithm
