Transversals to colorful intersecting convex sets
Abstract
Let be a compact convex set in and let be finite families of translates of such that for every and with . A conjecture by Dolnikov is that, under these conditions, there is always some such that can be pierced by points. In this paper we prove a stronger version of this conjecture when is a body of constant width or when it is close in Banach-Mazur distance to a disk. We also show that the conjecture is true with piercing points instead of . Along the way we prove more general statements both in the plane and in higher dimensions. A related result was given by Mart\'inez-Sandoval, Rold\'an-Pensado and Rubin. They showed that if are finite families of convex sets in such that for every choice of sets the intersection is non-empty, then either there exists such that can be pierced by few points or can be crossed by few lines. We give optimal values for the number of piercing points and crossing lines needed when and also consider the problem restricted to special families of convex sets.
Cite
@article{arxiv.2305.16760,
title = {Transversals to colorful intersecting convex sets},
author = {Cuauhtemoc Gomez-Navarro and Edgardo Roldán-Pensado},
journal= {arXiv preprint arXiv:2305.16760},
year = {2023}
}
Comments
14 pages, 9 figures