THE ERDOS-SZEKERES PROBLEM FOR NON-CROSSING CONVEX SETS
We show an equivalence between a conjecture of Bisztriczky and Fejes T ' oth 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 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 Erd " os-Szekeres theorem of P or and Valtr to families of non-crossing convex bodies.
- Publisher
- LONDON MATH SOC
- Issue Date
- 2014-07
- Language
- English
- Article Type
- Article
- Keywords
THEOREM; CONFIGURATIONS; BODIES; ARRANGEMENTS; POSITION; PLANES
- Citation
MATHEMATIKA, v.60, no.2, pp.463 - 484
- ISSN
- 0025-5793
- Appears in Collection
- MA-Journal Papers(저널논문)
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