Dowker-type theorems for disk-polygons in normed planes
Abstract
A classical result of Dowker (Bull. Amer. Math. Soc. 50: 120-122, 1944) states that for any plane convex body in the Euclidean plane, the areas of the maximum (resp. minimum) area convex -gons inscribed (resp. circumscribed) in is a concave (resp. convex) sequence. It is known that this theorem remains true if we replace area by perimeter, the Euclidean plane by an arbitrary normed plane, or convex -gons by disk--gons, obtained as the intersection of closed Euclidean unit disks. The aim of our paper is to investigate these problems for --gons, defined as intersections of translates of the unit disk of a normed plane. In particular, we show that Dowker's theorem remains true for the areas and the perimeters of circumscribed --gons, and the perimeters of inscribed --gons. We also show that in the family of origin-symmetric plane convex bodies, for a typical element with respect to Hausdorff distance, Dowker's theorem for the areas of inscribed --gons fails.
Cite
@article{arxiv.2307.04026,
title = {Dowker-type theorems for disk-polygons in normed planes},
author = {Bushra Basit and Zsolt Lángi},
journal= {arXiv preprint arXiv:2307.04026},
year = {2024}
}
Comments
21 pages, 5 figures