A parity Erdős-Hajnal theorem for t-intersecting curves

Abstract

For every fixed t 1, we prove a parity analogue of the mighty Erdős-Hajnal property for t-intersecting curves in the plane. Let B be a set of blue curves and G a set of green curves in the plane such that B G is a collection of t-intersecting curves in general position. We show that there exist subfamilies B'⊂eq B and G'⊂eq G such that | B'|≥ | B| and | G'|≥ | G|, where >0 depends only on t, such that either every pair in B'× G' intersects an even number of times or every such pair intersects an odd number of times. For t=1, this recovers the theorem of Fox, Pach, and Suk for pseudo-segments. As an application, we show that every n-vertex topological graph with edges forming a t-intersecting family and with no k edges that pairwise cross an odd number of times has at most n( n)Ot( k) edges.