Improved bounds for the crossing numbers of Km,n and Kn
Abstract
It has been long--conjectured that the crossing number cr(Km,n) of the complete bipartite graph Km,n equals the Zarankiewicz Number Z(m,n):= floor((m-1)/2) floor(m/2) floor((n-1)/2) floor(n/2). Another long--standing conjecture states that the crossing number cr(Kn) of the complete graph Kn equals Z(n):= floor(n/2) floor((n-1)/2) floor((n-2)/2) floor((n-3)/2)/4. In this paper we show the following improved bounds on the asymptotic ratios of these crossing numbers and their conjectured values: (i) for each fixed m >= 9, limn->infty cr(Km,n)/Z(m,n) >= 0.83m/(m-1); (ii) limn->infty cr(Kn,n)/Z(n,n) >= 0.83; and (iii) limn->infty cr(Kn)/Z(n) >= 0.83. 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(K7,n) >= 2.1796n2 - 4.5n. To obtain this improved lower bound for cr(K7,n), we use some elementary topological facts on drawings of K2,7 to set up a quadratic program on 6! variables whose minimum p satisfies cr(K7,n) >= (p/2)n2 - 4.5n, and then use state--of--the--art quadratic optimization techniques combined with a bit of invariant theory of permutation groups to show that p >= 4.3593.
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