R. Bruce Richter scite author profile

We describe a method of creating an infinite family of crossingcritical graphs from a single small planar map, the tile, by gluing together many copies of the tile together in a circular fashion. This method yields all known infinite families of k-crossing-critical graphs. Furthermore, the method yields new infinite families, which extend from [4,6) to (3.5,6) the interval of rationals r for which there is, for some k, an infinite sequence of k-crossing-critical graphs all having average degree r. ß

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

Klerk¹,

Maharry²,

Ṗasechnik³

et al. 2006

SIAM J. Discrete Math.

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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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Cayley maps

Richter

Širáň‬

Jajcay

et al. 2005

Journal of Combinatorial Theory, Series B

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We present a theory of Cayley maps, i.e., embeddings of Cayley graphs into oriented surfaces having the same cyclic rotation of generators around each vertex. These maps have often been used to encode symmetric embeddings of graphs. We also present an algebraic theory of Cayley maps and we apply the theory to determine exactly which regular or edge-transitive tilings of the sphere or plane are Cayley maps or Cayley graphs. Our main goal, however, is to provide the general theory so as to make it easier for others to study Cayley maps.

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R. Bruce Richter

Minimal Graphs with Crossing Number at Least k

2-Walks in Circuit Graphs

Crossing numbers of sequences of graphs II: Planar tiles

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

Cayley maps

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