Gelasio Salazar scite author profile

It has been long-conjectured that the crossing number cr(K m,n ) of the complete bipartite graph K m,n equals the Zarankiewicz Number Z(m, n) :Another long-standing conjecture states that the crossing number cr(K n ) of the complete graph K n equals Z(n) := 1 4. In this paper we show the following improved bounds on the asymptotic ratios of these crossing numbers and their conjectured values:The previous best known lower bounds were 0.8m/(m − 1), 0.8, and 0.8, respectively. These improved bounds are obtained as a consequence of the new bound cr(K 7,n ) ≥ 2.1796n 2 − 4.5n. To obtain this improved lower bound for cr(K 7,n ), we use some elementary topological facts on drawings of K 2,7 to set up a quadratic program on 6! variables whose minimum p satisfies cr(K 7,n ) ≥ (p/2)n 2 − 4.5n, and then use state-ofthe-art quadratic optimization techniques combined with a bit of invariant theory of permutation groups to show that p ≥ 4.3593.

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Characterizing 2-crossing-critical graphs

Bokal

Oporowski

Richter

et al. 2016

Advances in Applied Mathematics

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A c-crossing-critical graph is one that has crossing number at least c but each of its proper subgraphs has crossing number less than c. Recently, a set of explicit construction rules was identified by Bokal, Oporowski, Richter, and Salazar to generate all large 2-crossing-critical graphs (i.e., all apart from a finite set of small sporadic graphs). They share the property of containing a generalized Wagner graph V10 as a subdivision.In this paper, we study these graphs and establish their order, simple crossing number, edge cover number, clique number, maximum degree, chromatic number, chromatic index, and treewidth. We also show that the graphs are linear-time recognizable and that all our proofs lead to efficient algorithms for the above measures.

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Shellable Drawings and the Cylindrical Crossing Number of $$K_{n}$$ K n

Ábrego

Aichholzer

Fernández-Merchant

et al. 2014

Discrete Comput Geom

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Levi's Lemma, pseudolinear drawings of , and empty triangles

Arroyo

McQuillan

Richter

et al. 2017

Journal of Graph Theory

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The 2-Page Crossing Number of $$K_{n}$$ K n

Ábrego

Aichholzer

Fernández-Merchant

et al. 2013

Discrete Comput Geom

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Around 1958, Hill described how to draw the complete graph K n with Z (n) := 1 4 n 2 n − 1 2 n − 2 2 n − 3 2 K n in terms of its number of (≤ k)-edges to the topological setting. Finally, we give a complete characterization of crossing minimal 2-page book drawings of K n and show that, up to equivalence, they are unique for n even, but that there exist an exponential number of non-homeomorphic such drawings for n odd.

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Gelasio Salazar

Improved Bounds for the Crossing Numbers of Km,n and Kn

Characterizing 2-crossing-critical graphs

Shellable Drawings and the Cylindrical Crossing Number of $$K_{n}$$ K n

Levi's Lemma, pseudolinear drawings of , and empty triangles

The 2-Page Crossing Number of $$K_{n}$$ K n

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