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THE ERDŐS–SZEKERES PROBLEM FOR NON-CROSSING CONVEX SETS

Published online by Cambridge University Press:  14 May 2014

Michael Gene Dobbins
Affiliation:
GAIA, Postech, Pohang, South Korea email [email protected]
Andreas Holmsen
Affiliation:
Department of Mathematical Sciences, KAIST, Daejeon, South Korea email [email protected]
Alfredo Hubard
Affiliation:
Département d’informatique, École Normale Supérior, Paris, France email [email protected]
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Abstract

We show an equivalence between a conjecture of Bisztriczky and Fejes Tóth about families 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 Tóth on the Erdős–Szekeres theorem for disjoint convex bodies, as well as the recent upper bound obtained by Fox, Pach, Sudakov and Suk on the Erdős–Szekeres theorem for non-crossing convex bodies. Our methods also imply improvements on the positive fraction Erdős–Szekeres theorem for disjoint (and non-crossing) convex bodies, as well as a generalization of the partitioned Erdős–Szekeres theorem of Pór and Valtr to families of non-crossing convex bodies.

Type
Research Article
Copyright
Copyright © University College London 2014 

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