On the Number of Edges in Geometric Graphs Without Empty Triangles

Abstract

In this paper we study the extremal type problem arising from the question: What is the maximum number ET(S) of edges that a geometric graph G on a planar point set S can have such that it does not contain empty triangles? We prove: $${{n \choose 2} - O(n \log n) \leq ET(n) \leq {n \choose 2} - \left(n - 2 + \left\lfloor \frac{n}{8} \right\rfloor \right)}$$ .