The Erdos-Szekeres problem for non-crossing convex sets

Abstract

We show an equivalence between a conjecture of Bisztriczky and Fejes T\'oth about arrangements of planar convex bodies and a conjecture of Goodman and Pollack about point sets in topological affine planes. As a corollary of this equivalence we improve the upper bound of Pach and T\'oth on the Erdos-Szekeres theorem for disjoint convex bodies, as well as the recent upper bound obtained by Fox, Pach, Sudakov and Suk, on the Erdos-Szekeres theorem for non-crossing convex bodies. Our methods also imply improvements on the positive fraction Erdos-Szekeres theorem for disjoint (and non-crossing) convex bodies, as well as a generalization of the partitioned Erdos-Szekeres theorem of P\'or and Valtr to arrangements of non-crossing convex bodies.