Lower bounds on geometric Ramsey functions
Abstract
We continue a sequence of recent works studying Ramsey functions for semialgebraic predicates in . A -ary semialgebraic predicate on is a Boolean combination of polynomial equations and inequalities in the coordinates of points . A sequence of points in is called -homogeneous if either holds for all choices , or it holds for no such choice. The Ramsey function is the smallest such that every point sequence of length contains a -homogeneous subsequence of length . Conlon, Fox, Pach, Sudakov, and Suk constructed the first examples of semialgebraic predicates with the Ramsey function bounded from below by a tower function of arbitrary height: for every , they exhibit a -ary in dimension with bounded below by a tower of height . We reduce the dimension in their construction, obtaining a -ary semialgebraic predicate on with bounded below by a tower of height . We also provide a natural geometric Ramsey-type theorem with a large Ramsey function. We call a point sequence in order-type homogeneous if all -tuples in have the same orientation. Every sufficiently long point sequence in general position in contains an order-type homogeneous subsequence of length , and the corresponding Ramsey function has recently been studied in several papers. Together with a recent work of B\'ar\'any, Matou\v{s}ek, and P\'or, our results imply a tower function of of height as a lower bound, matching an upper bound by Suk up to the constant in front of .
Cite
@article{arxiv.1307.5157,
title = {Lower bounds on geometric Ramsey functions},
author = {Marek Eliáš and Jiří Matoušek and Edgardo Roldán-Pensado and Zuzana Safernová},
journal= {arXiv preprint arXiv:1307.5157},
year = {2014}
}
Comments
12 pages