Ordered graphs and large bi-cliques in intersection graphs of curves

Abstract

An ordered graph G< is a graph with a total ordering < on its vertex set. A monotone path of length k is a sequence of vertices v1<v2<…<vk such that vivj is an edge of G< if and only if |j-i|=1. A bi-clique of size m is a complete bipartite graph whose vertex classes are of size m. We prove that for every positive integer k, there exists a constant ck>0 such that every ordered graph on n vertices that does not contain a monotone path of length k as an induced subgraph has a vertex of degree at least ckn, or its complement has a bi-clique of size at least ckn/ n. A similar result holds for ordered graphs containing no induced ordered subgraph isomorphic to a fixed ordered matching. As a consequence, we give a short combinatorial proof of the following theorem of Fox and Pach. There exists a constant c>0 such the intersection graph G of any collection of n x-monotone curves in the plane has a bi-clique of size at least cn/ n or its complement contains a bi-clique of size at least cn. (A curve is called x-monotone if every vertical line intersects it in at most one point.) We also prove that if G has at most (14 -ε)n 2 edges for some ε>0, then G contains a linear sized bi-clique. We show that this statement does not remain true if we replace 14 by any larger constants.