Toric Sylvester forms
Abstract
In this paper, we investigate the structure of the saturation of ideals generated by sparse homogeneous polynomials over a projective toric variety with respect to the irrelevant ideal of . As our main results, we establish a duality property and make it explicit by introducing toric Sylvester forms, under a certain positivity assumption on . In particular, we prove that toric Sylvester forms yield bases of some graded components of , where denotes an ideal generated by generic forms, is the dimension of and the saturation of with respect to the irrelevant ideal of the Cox ring of . Then, to illustrate the relevance of toric Sylvester forms we provide three consequences in elimination theory over smooth toric varieties: (1) we introduce a new family of elimination matrices that can be used to solve sparse polynomial systems by means of linear algebra methods, including overdetermined polynomial systems; (2) by incorporating toric Sylvester forms to the classical Koszul complex associated to a polynomial system, we obtain new expressions of the sparse resultant as a determinant of a complex; (3) we explote a new formula for computing toric residues of the product of two forms.
Cite
@article{arxiv.2209.11281,
title = {Toric Sylvester forms},
author = {Laurent Busé and Carles Checa},
journal= {arXiv preprint arXiv:2209.11281},
year = {2024}
}
Comments
27 pages, 3 figures