Midrange crossing constants for graphs classes

Abstract

For positive integers n and e, let (n,e) be the minimum crossing number (the standard planar crossing number) taken over all graphs with n vertices and at least e edges. Pach, Spencer and T\'oth [Discrete and Computational Geometry 24 623--644, (2000)] showed that (n,e) n2/e3 tends to a positive constant (called midrange crossing constant) as n ∞ and n e n2, proving a conjecture of Erdos and Guy. In this note, we extend their proof to show that the midrange crossing constant exists for graph classes that satisfy a certain set of graph properties. As a corollary, we show that the the midrange crossing constant exists for the family of bipartite graphs. All these results have their analogues for rectilinear crossing numbers.