Continuous Tur\'an numbers
Abstract
In this paper, we define a notion of containment and avoidance for subsets of . Then we introduce a new, continuous and super-additive extremal function for subsets called , which is the supremum of over all open -free subsets , where denotes the Lebesgue measure of in . We show that fully encompasses the Zarankiewicz problem and more generally the 0-1 matrix extremal function up to a constant factor. More specifically, we define a natural correspondence between finite subsets and 0-1 matrices , and we prove that for all finite subsets , where the constants in the bounds depend only on the distances between the points in . We also discuss bounded infinite subsets for which grows faster than for all fixed 0-1 matrices . In particular, we show that for any open subset . We prove an even stronger result, that if is the set of points with rational coordinates in any open subset , then . Finally, we obtain a strengthening of the K\H{o}vari-S\'{o}s-Tur\'{a}n theorem that applies to infinite subsets of . Specifically, for subsets consisting of horizontal line segments of length with left endpoints on the same vertical line with consecutive segments a distance of apart, we prove that , where the constant in the bound depends on and . When , we show that this bound is sharp up to a constant factor that depends on .
Keywords
Cite
@article{arxiv.2105.04864,
title = {Continuous Tur\'an numbers},
author = {Jesse Geneson},
journal= {arXiv preprint arXiv:2105.04864},
year = {2021}
}