Very ample and Koszul segmental fibrations
Abstract
In the hierarchy of structural sophistication for lattice polytopes, normal polytopes mark a point of origin; very ample and Koszul polytopes occupy bottom and top spots in this hierarchy, respectively. In this paper we explore a simple construction for lattice polytopes with a twofold aim. On the one hand, we derive an explicit series of very ample 3-dimensional polytopes with arbitrarily large deviation from the normality property, measured via the highest discrepancy degree between the corresponding Hilbert functions and Hilbert polynomials. On the other hand, we describe a large class of Koszul polytopes of arbitrary dimensions, containing many smooth polytopes and extending the previously known class of Nakajima polytopes.
Keywords
Cite
@article{arxiv.1307.7422,
title = {Very ample and Koszul segmental fibrations},
author = {Matthias Beck and Jessica Delgado and Joseph Gubeladze and Mateusz Michałek},
journal= {arXiv preprint arXiv:1307.7422},
year = {2016}
}
Comments
15 pages, 3 figures