Semi-algebraic Ramsey numbers
Abstract
Given a finite point set , a -ary semi-algebraic relation on is the set of -tuples of points in , which is determined by a finite number of polynomial equations and inequalities in real variables. The description complexity of such a relation is at most if the number of polynomials and their degrees are all bounded by . The Ramsey number is the minimum such that any -element point set in equipped with a -ary semi-algebraic relation , such that has complexity at most , contains members such that every -tuple induced by them is in , or members such that every -tuple induced by them is not in . We give a new upper bound for for and fixed. In particular, we show that for fixed integers , establishing a subexponential upper bound on . This improves the previous bound of due to Conlon, Fox, Pach, Sudakov, and Suk, where is a very large constant depending on and . As an application, we give new estimates for a recently studied Ramsey-type problem on hyperplane arrangements in . We also study multi-color Ramsey numbers for triangles in our semi-algebraic setting, achieving some partial results.
Cite
@article{arxiv.1406.6550,
title = {Semi-algebraic Ramsey numbers},
author = {Andrew Suk},
journal= {arXiv preprint arXiv:1406.6550},
year = {2015}
}