English

A Generalization of a Classical Geometric Extremum Problem

Metric Geometry 2025-06-10 v1 Optimization and Control

Abstract

Let C\partial \,\mathcal{C} be the boundary of a compact convex body C\mathcal{C} in Rn,n2\mathbb{R}^n,\, n\geq 2, and OO be an interior point of C\mathcal C. Every straight line ll containing OO cuts from C\mathcal{C} a segment [AB][AB] with end-points on C\partial \,\mathcal{C}. It is shown that if [AB][AB] is the shortest such segment, then C\partial \,\mathcal{C} is smooth at the points AA and B B (i.e. at both of them there is only one supporting hyperplane for C\mathcal{C}) and, something more, the normals to the unique supporting hyperplanes at the points AA and BB intersect at a point belonging to the hiperplane through OO which is orthogonal to [AB][AB]. If C\mathcal{C} is a smooth compact convex body in Rn,n2\mathbb{R}^n,\, n\geq 2, the above property holds also when [AB][AB] is the longest such segment. Similar results have place also when OO is outside the set C\mathcal{C}. The ``local versions'' of these results (when the length AB|AB| of the segment [AB][AB] is locally maximal or locally minimal) also have a place. More specific results are obtained in the particular case when C\mathcal{C} is a convex polytope.

Keywords

Cite

@article{arxiv.2506.07252,
  title  = {A Generalization of a Classical Geometric Extremum Problem},
  author = {Petar Kenderov and Oleg Mushkarov and Nikolai Nikolov},
  journal= {arXiv preprint arXiv:2506.07252},
  year   = {2025}
}
R2 v1 2026-07-01T03:05:55.713Z