2019
DOI: 10.1002/jcd.21665
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Using block designs in crossing number bounds

Abstract: The crossing number normalCR ( G ) of a graph G goodbreakinfix= ( V , E ) is the smallest number of edge crossings over all drawings of G in the plane. For any k goodbreakinfix≥ 1, the k‐planar crossing number of G goodbreakinfix, CR k ( G ), is defined as the minimum of CR ( G 1 ) + CR ( G 2 ) + ⋯ + CR ( G k ) over all graphs G 1 goodbreakinfix, G 2 , … , G k with ∪ i = 1 k G i goodbreakinfix= G. Pach et al [Comput. Geom.: Theory Appl. 68 (2018), pp. 2–6] showed that for every k goodbreakinfix≥ 1, w… Show more

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Cited by 2 publications
(1 citation statement)
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“…For example, C can be the class of bipartite graphs. The existence of the midrange crossing constant for the class of bipartite graphs was needed to prove some tight crossing number results [4]. Angelini, Bekos, Kaufmann, Pfister and Ueckerdt [3] proved a stronger version of the Crossing Lemma for bipartite graphs.…”
Section: Introductionmentioning
confidence: 99%
“…For example, C can be the class of bipartite graphs. The existence of the midrange crossing constant for the class of bipartite graphs was needed to prove some tight crossing number results [4]. Angelini, Bekos, Kaufmann, Pfister and Ueckerdt [3] proved a stronger version of the Crossing Lemma for bipartite graphs.…”
Section: Introductionmentioning
confidence: 99%