Tournament pathwidth and topological containment
Author(s): Fradkin, Alexandra; Seymour, Paul D.
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http://arks.princeton.edu/ark:/88435/pr17t07| Abstract: | We prove that if a tournament has pathwidth >= 4 theta(2) + 7 theta then it has theta vertices that are pairwise theta-connected. As a consequence of this and previous results, we obtain that for every set S of tournaments the following are equivalent: there exists k such that every member of S has pathwidth at most k, there is a digraph H such that no subdivision of H is a subdigraph of any member of S, there exists k such that for each T is an element of S, there do not exist k vertices of T that are pairwise k-connected. As a further consequence, we obtain a polynomial-time algorithm to test whether a tournament contains a subdivision of a fixed digraph H as a subdigraph. (C) 2013 Elsevier Inc. All rights reserved. |
| Publication Date: | May-2013 |
| Electronic Publication Date: | 26-Mar-2013 |
| Citation: | Fradkin, Alexandra, Seymour, Paul. (2013). Tournament pathwidth and topological containment. JOURNAL OF COMBINATORIAL THEORY SERIES B, 103 (374 - 384. doi:10.1016/j.jctb.2013.03.001 |
| DOI: | doi:10.1016/j.jctb.2013.03.001 |
| ISSN: | 0095-8956 |
| Pages: | 374 - 384 |
| Type of Material: | Journal Article |
| Journal/Proceeding Title: | JOURNAL OF COMBINATORIAL THEORY SERIES B |
| Version: | Final published version. Article is made available in OAR by the publisher's permission or policy. |
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