On the Erdos-Tuza-Valtr Conjecture

Abstract

The Erdos-Szekeres conjecture states that any set of more than 2n-2 points in the plane with no three on a line contains the vertices of a convex n-gon. Erdos, Tuza, and Valtr strengthened the conjecture by stating that any set of more than Σi = n - ba - 2 n - 2i points in a plane either contains the vertices of a convex n-gon, a points lying on a concave downward curve, or b points lying on a concave upward curve. They also showed that the generalization is actually equivalent to the Erdos-Szekeres conjecture. We prove the first new case of the Erdos-Tuza-Valtr conjecture since the original 1935 paper of Erdos and Szekeres. Namely, we show that any set of n-12 + 2 points in the plane with no three points on a line and no two points sharing the same x-coordinate either contains 4 points lying on a concave downward curve or the vertices of a convex n-gon.