English

Polyhedral Homotopies in Cox Coordinates

Algebraic Geometry 2020-12-09 v1

Abstract

We introduce the Cox homotopy algorithm for solving a sparse system of polynomial equations on a compact toric variety XΣX_\Sigma. The algorithm lends its name from a construction, described by Cox, of XΣX_\Sigma as a GIT quotient XΣ=(CkZ)//GX_\Sigma = (\mathbb{C}^k \setminus Z) // G of a quasi-affine variety by the action of a reductive group. Our algorithm tracks paths in the total coordinate space Ck\mathbb{C}^k of XΣX_\Sigma and can be seen as a homogeneous version of the standard polyhedral homotopy, which works on the dense torus of XΣX_\Sigma. It furthermore generalizes the commonly used path tracking algorithms in (multi)projective spaces in that it tracks a set of homogeneous coordinates contained in the GG-orbit corresponding to each solution. The Cox homotopy combines the advantages of polyhedral homotopies and (multi)homogeneous homotopies, tracking only mixed volume many solutions and providing an elegant way to deal with solutions on or near the special divisors of XΣX_\Sigma. In addition, the strategy may help to understand the deficiency of the root count for certain families of systems with respect to the BKK bound.

Keywords

Cite

@article{arxiv.2012.04255,
  title  = {Polyhedral Homotopies in Cox Coordinates},
  author = {Timothy Duff and Simon Telen and Elise Walker and Thomas Yahl},
  journal= {arXiv preprint arXiv:2012.04255},
  year   = {2020}
}

Comments

27 pages, 6 figures

R2 v1 2026-06-23T20:48:25.654Z