Codimension two and three Kneser Transversals
Abstract
Let be integers with and let be a finite set of points in . A -plane transversal to the convex hulls of all -sets of is called Kneser transversal. If in addition contains points of , then is called complete Kneser transversal.In this paper, we present various results on the existence of (complete) Kneser transversals for . In order to do this, we introduce the notions of stability and instability for (complete) Kneser transversals. We first give a stability result for collections of points in with and . We then present a description of Kneser transversals of collections of points in with for . We show that either is a complete Kneser transversal or it contains points and the remaining points of are matched in pairs in such a way that intersects the corresponding closed segments determined by them. The latter leads to new upper and lower bounds (in the case when and ) for defined as the maximum positive integer such that every set of points (not necessarily in general position) in admit a Kneser transversal.Finally, by using oriented matroid machinery, we present some computational results (closely related to the stability and unstability notions). We determine the existence of (complete) Kneser transversals for each of the different order types of configurations of points in .
Cite
@article{arxiv.1601.00421,
title = {Codimension two and three Kneser Transversals},
author = {Jonathan Chappelon and Leonardo Martínez-Sandoval and Luis Montejano and Luis Pedro Montejano and Jorge Luis Ramírez Alfonsín},
journal= {arXiv preprint arXiv:1601.00421},
year = {2017}
}