Algebraic Distance Optimization in Polyhedral Norms
Algebraic Geometry
2026-04-22 v1 Metric Geometry
Abstract
We consider the distance minimization problem to a real algebraic variety when the metric is induced by a polyhedral norm. Each point in the variety has a Voronoi cell whose geometry depends on the normal space at the point and the inner normal fan of the polyhedral ball. For codimension-one varieties, we decompose into sets of points whose Voronoi cones have the same dimension, which is the expected dimension of their Voronoi cell. We prove that this decomposition is a stratification of and that each strata is a semialgebraic set. We conclude by giving an algebraic description of the medial axis, which is the locus of points whose minimal distance to is achieved at more than one point on .
Cite
@article{arxiv.2604.19479,
title = {Algebraic Distance Optimization in Polyhedral Norms},
author = {Eliana Duarte and Nidhi Kaihnsa and Julia Lindberg and Angélica Torres and Madeleine Weinstein},
journal= {arXiv preprint arXiv:2604.19479},
year = {2026}
}