Skip to main content

Research Repository

Advanced Search

Ehrhart Theory of Spanning Lattice Polytopes

Hofscheier, Johannes; Katth�n, Lukas; Nill, Benjamin

Ehrhart Theory of Spanning Lattice Polytopes Thumbnail


Authors

Lukas Katth�n

Benjamin Nill



Abstract

© 2018 Oxford University Press. All rights reserved. The key object in the Ehrhart theory of lattice polytopes is the numerator polynomial of the rational generating series of the Ehrhart polynomial, called h-polynomial. In this article, we prove a new result on the vanishing of its coefficients. As a consequence, we get that hi = 0 implies hi+1 = 0 if the lattice points of the lattice polytope affinely span the ambient lattice. This generalizes a recent result in algebraic geometry due to Blekherman, Smith, and Velasco, and implies a polyhedral consequence of the Eisenbud Goto conjecture. We also discuss how this study is motivated by unimodality questions and how it relates to decomposition results on lattice polytopes of given degree. The proof methods involve a novel combination of successive modifications of half-open triangulations and considerations of number-theoretic step functions.

Citation

Hofscheier, J., Katthän, L., & Nill, B. (2018). Ehrhart Theory of Spanning Lattice Polytopes. International Mathematics Research Notices, 2018(19), 5947-5973. https://doi.org/10.1093/imrn/rnx065

Journal Article Type Article
Acceptance Date Feb 27, 2017
Online Publication Date Mar 26, 2017
Publication Date Oct 9, 2018
Deposit Date Nov 12, 2019
Publicly Available Date Nov 14, 2019
Journal International Mathematics Research Notices
Print ISSN 1073-7928
Electronic ISSN 1687-0247
Publisher Oxford University Press
Peer Reviewed Peer Reviewed
Volume 2018
Issue 19
Pages 5947-5973
DOI https://doi.org/10.1093/imrn/rnx065
Keywords General Mathematics
Public URL https://nottingham-repository.worktribe.com/output/3234036
Publisher URL https://academic.oup.com/imrn/article/2018/19/5947/3091116
Contract Date Nov 14, 2019

Files





You might also like



Downloadable Citations