Extremal structure in dense arrangements of k-intersecting curves

Abstract

Let P be a set of n points in the plane, and let C be a collection of n simple k-intersecting curves, meaning that every two distinct curves of C meet in at most k points. A classical theorem of Pach and Sharir from 1998 gives the upper bound I(P, C)=Ok(n(3k+1)/(2k+1)). We prove that this bound can be improved when one excludes a complete local incidence pattern. More precisely, for any fixed integers s>k+1 2, if there do not exist s points of P such that every (k+1)-tuple among them is contained in a distinct curve of C, then I(P, C)=o(n(3k+1)/(2k+1)). In the special case of pseudo-segments, this extends Solymosi's theorem on dense point-line arrangements to dense arrangements of pseudo-segments.