Bounding the number of non-duplicates of the q-side in simple drawings of Kp,q

Abstract

The number Z(n):= n/2 (n-1)/2 is the smallest number of crossings in a simple planar drawing of K2,n in which both vertices on the 2-side have the same clockwise rotation. For two vertices u,v on the q-side of a simple drawing of Kp,q, let crD(u,v) denote the total number of crossings that edges incident with u have with edges incident with v. We show that in any simple drawing D of Kp,q in a surface the number of pairs of vertices on the q-side of Kp,q having crD(u,v)<Z(p) is bounded as a function of p and . As a consequence, we also show that, for a fixed integer p and surface , there exists a finite set of drawings D(p,) of complete bipartite graphs such that, for each q, a crossing-minimal drawing of Kp,q can be obtained by "duplicating vertices" in some drawing from D(p,).