English

The Distance Function from a Real Algebraic Variety

Algebraic Geometry 2025-12-02 v3

Abstract

For any (real) algebraic variety XX in a Euclidean space VV endowed with a nondegenerate quadratic form qq, we introduce a polynomial EDpolyX,u(t2)\mathrm{EDpoly}_{X,u}(t^2) which, for any uVu\in V, has among its roots the distance from uu to XX. The degree of EDpolyX,u\mathrm{EDpoly}_{X,u} is the {\em Euclidean Distance degree} of XX. We prove a duality property when XX is a projective variety, namely EDpolyX,u(t2)=EDpolyX,u(q(u)t2)\mathrm{EDpoly}_{X,u}(t^2)=\mathrm{EDpoly}_{X^\vee,u}(q(u)-t^2) where XX^\vee is the dual variety of XX. When XX is transversal to the isotropic quadric QQ, we prove that the ED polynomial of XX is monic and the zero locus of its lower term is X(XQ)X\cup(X^\vee\cap Q)^\vee.

Keywords

Cite

@article{arxiv.1807.10390,
  title  = {The Distance Function from a Real Algebraic Variety},
  author = {Giorgio Ottaviani and Luca Sodomaco},
  journal= {arXiv preprint arXiv:1807.10390},
  year   = {2025}
}

Comments

24 pages, 4 figures, accepted for publication in Computer Aided Geometric Design

R2 v1 2026-06-23T03:16:09.401Z