Point Sets with Small Integer Coordinates and with Small Convex Polygons

Abstract

In 1935, Erdos and Szekeres proved that every set of n points in general position in the plane contains the vertices of a convex polygon of 122(n) vertices. In 1961, they constructed, for every positive integer t, a set of n:=2t-2 points in general position in the plane, such that every convex polygon with vertices in this set has at most 2(n)+1 vertices. In this paper we show how to realize their construction in an integer grid of size O(n2 2(n)3).