P 4-Colorings and P 4-Bipartite Graphs
A vertex partition of a graph into disjoint subsets V i s is said to be a P 4-free coloring if each color class V i induces a subgraph without chordless path on four vertices (denoted by P 4). Examples of P 4-free 2-colorable graphs (also called P 4-bipartite graphs) include parity...
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Discrete Mathematics & Theoretical Computer Science
2001-12-01
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| Series: | Discrete Mathematics & Theoretical Computer Science |
| Online Access: | http://www.dmtcs.org/dmtcs-ojs/index.php/dmtcs/article/view/140 |
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doaj-86cf30d424144052baccf703c61937812020-11-24T23:46:15ZengDiscrete Mathematics & Theoretical Computer ScienceDiscrete Mathematics & Theoretical Computer Science1462-72641365-80502001-12-0142P 4-Colorings and P 4-Bipartite GraphsChính T. HoàngVan Bang LeA vertex partition of a graph into disjoint subsets V i s is said to be a P 4-free coloring if each color class V i induces a subgraph without chordless path on four vertices (denoted by P 4). Examples of P 4-free 2-colorable graphs (also called P 4-bipartite graphs) include parity graphs and graphs with ``few'' P 4 s like P 4-reducible and P 4-sparse graphs. We prove that, given k≥2, P 4-Free k-Colorability is NP-complete even for comparability graphs, and for P 5-free graphs. We then discuss the recognition, perfection and the Strong Perfect Graph Conjecture (SPGC) for P 4-bipartite graphs with special P 4-structure. In particular, we show that the SPGC is true for P 4-bipartite graphs with one P 3-free color class meeting every P 4 at a midpoint. http://www.dmtcs.org/dmtcs-ojs/index.php/dmtcs/article/view/140 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Chính T. Hoàng Van Bang Le |
| spellingShingle |
Chính T. Hoàng Van Bang Le P 4-Colorings and P 4-Bipartite Graphs Discrete Mathematics & Theoretical Computer Science |
| author_facet |
Chính T. Hoàng Van Bang Le |
| author_sort |
Chính T. Hoàng |
| title |
P 4-Colorings and P 4-Bipartite Graphs |
| title_short |
P 4-Colorings and P 4-Bipartite Graphs |
| title_full |
P 4-Colorings and P 4-Bipartite Graphs |
| title_fullStr |
P 4-Colorings and P 4-Bipartite Graphs |
| title_full_unstemmed |
P 4-Colorings and P 4-Bipartite Graphs |
| title_sort |
p 4-colorings and p 4-bipartite graphs |
| publisher |
Discrete Mathematics & Theoretical Computer Science |
| series |
Discrete Mathematics & Theoretical Computer Science |
| issn |
1462-7264 1365-8050 |
| publishDate |
2001-12-01 |
| description |
A vertex partition of a graph into disjoint subsets V i s is said to be a P 4-free coloring if each color class V i induces a subgraph without chordless path on four vertices (denoted by P 4). Examples of P 4-free 2-colorable graphs (also called P 4-bipartite graphs) include parity graphs and graphs with ``few'' P 4 s like P 4-reducible and P 4-sparse graphs. We prove that, given k≥2, P 4-Free k-Colorability is NP-complete even for comparability graphs, and for P 5-free graphs. We then discuss the recognition, perfection and the Strong Perfect Graph Conjecture (SPGC) for P 4-bipartite graphs with special P 4-structure. In particular, we show that the SPGC is true for P 4-bipartite graphs with one P 3-free color class meeting every P 4 at a midpoint. |
| url |
http://www.dmtcs.org/dmtcs-ojs/index.php/dmtcs/article/view/140 |
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AT chinhthoang p4coloringsandp4bipartitegraphs AT vanbangle p4coloringsandp4bipartitegraphs |
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