论文信息 - More on the crossing number of Kn: Monotone drawings

More on the crossing number of Kn: Monotone drawings

Abstract The Harary-Hill conjecture states that the minimum number of crossings in a drawing of the complete graph K n is Z ( n ) : = 1 4 ⌊ n 2 ⌋ ⌊ n − 1 2 ⌋ ⌊ n − 2 2 ⌋ ⌊ n − 3 2 ⌋ . This conjecture was recently proved for 2-page book drawings of K n . As an extension of this technique, we prove the conjecture for monotone drawings of Kn, that is, drawings where all vertices have different x-coordinates and the edges are x-monotone curves.

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