On a geometric extremum problem for convex cones
Abstract
We discuss the optimization problem for minimizing the -volume of the intersection of a convex cone in with a hyperplane through a given point, first considered in \cite{We}. We give a geometric characterization of the stationary hyperplanes for this problem when is a hyperangle which partially answers a question posed in \cite{We}. Moreover, we study the location of the set of points for which there is a stationary hyperplane as well as the infimum of the -volumes of cone segments of cut off by hyperplanes through a given boundary point of . As a model example we study in detail the non-negative orthant of . In this case is its interior and we show that every point of lies in a unique stationary hyperplane, which we describe in terms of the unique real root of an irrational equation.
Cite
@article{arxiv.2502.19381,
title = {On a geometric extremum problem for convex cones},
author = {Oleg Mushkarov and Nikolai Nikolov},
journal= {arXiv preprint arXiv:2502.19381},
year = {2025}
}
Comments
v2: Propostions 3 and 5 are added