A Sylvester-Gallai result for concurrent lines in the complex plane

Abstract

We show that if a set of points in C2 lies on a family of m concurrent lines, and if one of those lines contains more than m-2 points, then there is a line passing through exactly two points of the set. The bound m-2 in our result is optimal. Our main theorem resolves a conjecture of Frank de Zeeuw, and generalizes a result of Kelly and Nwankpa.