Many Order Types on Integer Grids of Polynomial Size

Abstract

Two labeled point configurations \p1,…,pn\ and \q1,…,qn\ are of the same order type if, for every i,j,k, the triples (pi,pj,pk) and (qi,qj,qk) have the same orientation. In the 1980's, Goodman, Pollack and Sturmfels showed that (i) the number of order types on n points is of order 4n+o(n), (ii) all order types can be realized with double-exponential integer coordinates, and that (iii) certain order types indeed require double-exponential integer coordinates. In 2018, Caraballo, D\'iaz-B\'a\~nez, Fabila-Monroy, Hidalgo-Toscano, Lea\~nos, Montejano showed that at least n3n+o(n) order types can be realized on an integer grid of polynomial size. In this article, we improve their result by showing that at least n4n+o(n) order types can be realized on an integer grid of polynomial size, which is essentially best possible.