English

Degeneracy loci and polynomial equation solving

Algebraic Geometry 2013-12-17 v2 Symbolic Computation

Abstract

Let V be a smooth equidimensional quasi-affine variety of dimension r over the complex numbers CC and let FF be a (p×s)(p\times s)-matrix of coordinate functions of C[V]C[V], where sp+rs\ge p+r. The pair (V,F)(V,F) determines a vector bundle EE of rank sps-p over W:={xV:rkF(x)=p}W:=\{x\in V:\mathrm{rk} F(x)=p\}. We associate with (V,F)(V,F) a descending chain of degeneracy loci of E (the generic polar varieties of VV represent a typical example of this situation). The maximal degree of these degeneracy loci constitutes the essential ingredient for the uniform, bounded error probabilistic pseudo-polynomial time algorithm which we are going to design and which solves a series of computational elimination problems that can be formulated in this framework. We describe applications to polynomial equation solving over the reals and to the computation of a generic fiber of a dominant endomorphism of an affine space.

Keywords

Cite

@article{arxiv.1306.3390,
  title  = {Degeneracy loci and polynomial equation solving},
  author = {Bernd Bank and Marc Giusti and Joos Heintz and Grégoire Lecerf and Guillermo Matera and Pablo Solernó},
  journal= {arXiv preprint arXiv:1306.3390},
  year   = {2013}
}

Comments

24 pages, accepted for publication in Found. Comput. Math

R2 v1 2026-06-22T00:33:55.119Z