Improving the Crossing Lemma by Characterizing Dense 2-Planar and 3-Planar Graphs

Abstract

The classical Crossing Lemma by Ajtai et al.~and Leighton from 1982 gave an important lower bound of c m3n2 for the number of crossings in any drawing of a given graph of n vertices and m edges. The original value was c= 1/100, which then has gradually been improved. Here, the bounds for the density of k-planar graphs played a central role. Our new insight is that for k=2,3 the k-planar graphs have substantially fewer edges if specific local configurations that occur in drawings of k-planar graphs of maximum density are forbidden. Therefore, we are able to derive better bounds for the crossing number cr(G) of a given graph G. In particular, we achieve a bound of cr(G) 379m-1559(n-2) for the range of 5n < m 6n, while our second bound cr(G) 5m - 2039(n-2) is even stronger for larger m>6n. For m > 6.77n, we finally apply the standard probabilistic proof from the BOOK and obtain an improved constant of c>1/27.48 in the Crossing Lemma. Note that the previous constant was 1/29. Although this improvement is not too impressive, we consider our technique as an important new tool, which might be helpful in various other applications.