Disjoint edges in topological graphs and the tangled-thrackle conjecture

Abstract

It is shown that for a constant t∈ N, every simple topological graph on n vertices has O(n) edges if it has no two sets of t edges such that every edge in one set is disjoint from all edges of the other set (i.e., the complement of the intersection graph of the edges is Kt,t-free). As an application, we settle the tangled-thrackle conjecture formulated by Pach, Radoici\'c, and T\'oth: Every n-vertex graph drawn in the plane such that every pair of edges have precisely one point in common, where this point is either a common endpoint, a crossing, or a point of tangency, has at most O(n) edges.