On topological graphs with at most four crossings per edge

Abstract

We show that if a graph G with n ≥ 3 vertices can be drawn in the plane such that each of its edges is involved in at most four crossings, then G has at most 6n-12 edges. This settles a conjecture of Pach, Radoici\'c, Tardos, and T\'oth, and yields a better bound for the famous Crossing Lemma: The crossing number, cr(G), of a (not too sparse) graph G with n vertices and m edges is at least cm3n2, where c > 1/29. This bound is known to be tight, apart from the constant c for which the previous best lower bound was 1/31.1. As another corollary we obtain some progress on the Albertson conjecture: Albertson conjectured that if the chromatic number of a graph G is r, then cr(G) ≥ cr(Kr). This was verified by Albertson, Cranston, and Fox for r ≤ 12, and for r ≤ 16 by Bar\'at and T\'oth. Our results imply that Albertson conjecture holds for r ≤ 18.