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A new characterization of P6-free graphs

Hof, P. van't; Paulusma, D.

Authors

P. van't Hof



Contributors

Xiaodong Hu
Editor

Jie Wang
Editor

Abstract

We study P 6-free graphs, i.e., graphs that do not contain an induced path on six vertices. Our main result is a new characterization of this graph class: a graph G is P 6-free if and only if each connected induced subgraph of G on more than one vertex contains a dominating induced cycle on six vertices or a dominating (not necessarily induced) complete bipartite subgraph. This characterization is minimal in the sense that there exists an infinite family of P 6-free graphs for which a smallest connected dominating subgraph is a (not induced) complete bipartite graph. Our characterization of P 6-free graphs strengthens results of Liu and Zhou, and of Liu, Peng and Zhao. Our proof has the extra advantage of being constructive: we present an algorithm that finds such a dominating subgraph of a connected P 6-free graph in polynomial time. This enables us to solve the Hypergraph 2-Colorability problem in polynomial time for the class of hypergraphs with P 6-free incidence graphs.

Citation

Hof, P. V., & Paulusma, D. (2008, December). A new characterization of P6-free graphs. Presented at 14th Annual International Computing and Combinatorics Conference, Dalian, China

Presentation Conference Type Conference Paper (published)
Conference Name 14th Annual International Computing and Combinatorics Conference
Publication Date Jun 1, 2008
Deposit Date Oct 6, 2010
Print ISSN 0302-9743
Pages 415-424
Series Title Lecture notes in computer science
Series Number 5092
Series ISSN 0302-9743,1611-3349
Edition 14th ed.
Book Title Computing and combinatorics, 14th Annual International Conference, COCOON 2008, 27-29 June 2008 Dalian, China ; proceedings.
DOI https://doi.org/10.1007/978-3-540-69733-6_41
Public URL https://durham-repository.worktribe.com/output/1159279



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