A Transformation Which Preserves the Clique Number

A Berge-keeping operation for graphs

Sebő, András

October 2006

AbstractWe prove that a certain simple operation does not create odd holes or odd antiholes in a gra...

Bounding clique-width via perfect graphs.

Dabrowski, K.K.
Huang, S.
Paulusma, D.

February 2015

Given two graphs H1 and H2, a graph G is (H1,H2)-free if it contains no subgraph isomorphic to H1 or...

The Strong Perfect Graph Conjecture for pan-free graphs

Olariu, Stephan

October 1989

AbstractA graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals ...

A Transformation Which Preserves the Clique Number

Gerber, Michael U.
Hertz, Alain

November 2001

AbstractWe introduce a graph transformation which preserves the clique number. When applied to graph...

Results on perfect graphs

Petrick, Mark David Timothy

January 2000

The chromatic number of a graph G is the least number of colours that can be assigned to the vertic...

Recognizing claw-free perfect graphs

Chvátal, V
Sbihi, N

April 1988

AbstractWe present a polynomial-time algorithm to recognize claw-free perfect graphs. The algorithm ...

A reduction procedure for coloring perfect K4-free graphs

Tucker, Alan

October 1987

AbstractThis paper presents an algorithmic proof of the validity of the Strong Perfect Graph Conject...

Even-hole-free graphs that do not contain diamonds: A structure theorem and its consequences

Kloks, Ton
Müller, Haiko
Vušković, Kristina

September 2009

AbstractIn this paper we consider the class of simple graphs defined by excluding, as induced subgra...

Coloring perfect (K4 − e)-free graphs

Tucker, Alan

June 1987

AbstractThis note proves the Strong Perfect Graph Conjecture for (K4 − e)-free graphs from first pri...

Algorithms for minimum covering by cliques and maximum clique in claw-free perfect graphs

Hsu, Wen-Lian
Nemhauser, George L.

December 1981

AbstractAn algorithm is given for determining a minimum cardinality clique cover ongraphs that do no...

Structural Characterisations of Hereditary Graph Classes and Algorithmic Consequences

Horsfield, Jake

September 2022

A hole is a chordless cycle of length at least four, and is even or odd depending onthe parity of it...

On (P5, diamond)-free graphs

Arbib, Claudio
Mosca, Raffaele

May 2002

AbstractWe study the stability number, chromatic number and clique cover of graphs with no induced P...

Even-hole-free graphs that do not contain diamonds: A structure theorem and its consequences

Kloks, T
Muller, H
Vuskovic, K

September 2009

In this paper we consider the class of simple graphs defined by excluding, as induced subgraphs, eve...

The Strong Perfect Graph Conjecture for Pan-Free Graphs

Olariu, Stephan

January 1989

A graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals the larg...

The Strong Perfect Graph Conjecture for Pan-Free Graphs

Olariu, Stephan

January 1989

A graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals the larg...

A Berge-keeping operation for graphs

Sebő, András

October 2006

AbstractWe prove that a certain simple operation does not create odd holes or odd antiholes in a gra...

Bounding clique-width via perfect graphs.

Dabrowski, K.K.
Huang, S.
Paulusma, D.

February 2015

Given two graphs H1 and H2, a graph G is (H1,H2)-free if it contains no subgraph isomorphic to H1 or...

The Strong Perfect Graph Conjecture for pan-free graphs

Olariu, Stephan

October 1989

AbstractA graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals ...

A Transformation Which Preserves the Clique Number

Gerber, Michael U.
Hertz, Alain

November 2001

AbstractWe introduce a graph transformation which preserves the clique number. When applied to graph...

Results on perfect graphs

Petrick, Mark David Timothy

January 2000

The chromatic number of a graph G is the least number of colours that can be assigned to the vertic...

Recognizing claw-free perfect graphs

Chvátal, V
Sbihi, N

April 1988

AbstractWe present a polynomial-time algorithm to recognize claw-free perfect graphs. The algorithm ...

A reduction procedure for coloring perfect K4-free graphs

Tucker, Alan

October 1987

AbstractThis paper presents an algorithmic proof of the validity of the Strong Perfect Graph Conject...

Even-hole-free graphs that do not contain diamonds: A structure theorem and its consequences

Kloks, Ton
Müller, Haiko
Vušković, Kristina

September 2009

AbstractIn this paper we consider the class of simple graphs defined by excluding, as induced subgra...

Coloring perfect (K4 − e)-free graphs

Tucker, Alan

June 1987

AbstractThis note proves the Strong Perfect Graph Conjecture for (K4 − e)-free graphs from first pri...

Algorithms for minimum covering by cliques and maximum clique in claw-free perfect graphs

Hsu, Wen-Lian
Nemhauser, George L.

December 1981

AbstractAn algorithm is given for determining a minimum cardinality clique cover ongraphs that do no...

Structural Characterisations of Hereditary Graph Classes and Algorithmic Consequences

Horsfield, Jake

September 2022

A hole is a chordless cycle of length at least four, and is even or odd depending onthe parity of it...

On (P5, diamond)-free graphs

Arbib, Claudio
Mosca, Raffaele

May 2002

AbstractWe study the stability number, chromatic number and clique cover of graphs with no induced P...

Even-hole-free graphs that do not contain diamonds: A structure theorem and its consequences

Kloks, T
Muller, H
Vuskovic, K

September 2009

In this paper we consider the class of simple graphs defined by excluding, as induced subgraphs, eve...

The Strong Perfect Graph Conjecture for Pan-Free Graphs

Olariu, Stephan

January 1989

A graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals the larg...

The Strong Perfect Graph Conjecture for Pan-Free Graphs

Olariu, Stephan

January 1989

A graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals the larg...

A Berge-keeping operation for graphs

Sebő, András

October 2006

AbstractWe prove that a certain simple operation does not create odd holes or odd antiholes in a gra...

Bounding clique-width via perfect graphs.

Dabrowski, K.K.
Huang, S.
Paulusma, D.

February 2015

Given two graphs H1 and H2, a graph G is (H1,H2)-free if it contains no subgraph isomorphic to H1 or...

The Strong Perfect Graph Conjecture for pan-free graphs

Olariu, Stephan

October 1989

AbstractA graph G is perfect if for every induced subgraph F of G, the chromatic number χ(F) equals ...

A Transformation Which Preserves the Clique Number

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A Transformation Which Preserves the Clique Number

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