On balanced separators, treewidth, and cycle rank

Hermann Gruber

Journal ArticleOPEN ACCESS

On balanced separators, treewidth, and cycle rank

Gruber H

Journal of Combinatorics (2012) 3(4) 669-681

DOI: 10.4310/joc.2012.v3.n4.a5

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Abstract

We investigate relations between different width parameters of graphs, in particular balanced separator number, treewidth, and cycle rank. Our main result states that a graph with balanced separator number k has treewidth at least k but cycle rank at most k(1 + log (n/k)), thus refining the previously known bounds, as stated by Robertson and Seymour (1986) and by Bodlaender et al. (1995). Furthermore, we show that the improved bounds are best possible.

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Gruber, H. (2012). On balanced separators, treewidth, and cycle rank. Journal of Combinatorics, 3(4), 669–681. https://doi.org/10.4310/joc.2012.v3.n4.a5

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On balanced separators, treewidth, and cycle rank

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