Point sets that minimize ( k)-edges, 3-decomposable drawings, and the rectilinear crossing number of K30

Abstract

There are two properties shared by all known crossing-minimizing geometric drawings of Kn, for n a multiple of 3. First, the underlying n-point set of these drawings has exactly 3k+22 ( k)-edges, for all 0 k < n/3. Second, all such drawings have the n points divided into three groups of equal size; this last property is captured under the concept of 3-decomposability. In this paper we show that these properties are tightly related: every n-point set with exactly 3k+22 ( k)-edges for all 0 k < n/3, is 3-decomposable. As an application, we prove that the rectilinear crossing number of K30 is 9726.