Chebyshev sets and ball operators
Abstract
The Chebyshev set of a bounded set in a normed space is the set of centers of all minimal enclosing balls of . We use the concept of ball intersection and ball hull operators to derive new properties of Chebyshev sets in normed spaces. These results give a better picture on how Chebyshev sets, ball intersections, ball hulls, and completions of bounded sets are related to each other. It is shown that the Chebyshev set of a bounded set always contains the Chebyshev set of some completion of . Moreover, for a special class of sets we obtain a necessary and sufficient condition that the Chebyshev set of the respective set is a singleton. We obtain new results on critical sets of Chebyshev centers, and for that purpose, surprisingly, notions from the combinatorial geometry of convex bodies play an essential role. Also we give a complete geometric description of the ball hull of a finite planar set. This can be taken as starting point for algorithmical constructions of the ball hull of such sets.
Cite
@article{arxiv.2601.14317,
title = {Chebyshev sets and ball operators},
author = {Horst Martini and Pedro Martín and Margarita Spirova},
journal= {arXiv preprint arXiv:2601.14317},
year = {2026}
}
Comments
19 pages, 6 figures