Separating Cones defined by Toric Varieties: Some Properties and Open Problems
Abstract
In 1888, Hilbert proved that the cone of positive semidefinite forms in variables of degree coincides with its subcone of those forms that are representable as finite sums of squares if and only if or or . These are the Hilbert cases. In [GHK23, GHK24], we applied the Gram matrix method to construct cones between and , defined by projective varieties containing the Veronese variety. In particular, we introduced and examined a specific cone filtration and determined each strict inclusion in non-Hilbert cases. This gave us a refinement of Hilbert's 1888 theorem. Here, is the dimension of the vector space of forms in variables of degree . In this paper, we show that the intermediate cones 's are closed and describe their interiors and boundaries. We discuss the membership problem for the 's, present open problems concerning their dual cones and generalizations to cones defined by toric varieties.
Keywords
Cite
@article{arxiv.2411.06468,
title = {Separating Cones defined by Toric Varieties: Some Properties and Open Problems},
author = {Charu Goel and Sarah Hess and Salma Kuhlmann},
journal= {arXiv preprint arXiv:2411.06468},
year = {2024}
}
Comments
[GHK23]: arXiv:2303.13178 [GHK24]: arXiv:2401.03813