Enriched chain polytopes
Abstract
Stanley introduced a lattice polytope arising from a finite poset , which is called the chain polytope of . The geometric structure of has good relations with the combinatorial structure of . In particular, the Ehrhart polynomial of is given by the order polynomial of . In the present paper, associated to , we introduce a lattice polytope , which is called the enriched chain polytope of , and investigate geometric and combinatorial properties of this polytope. By virtue of the algebraic technique on Gr\"{o}bner bases, we see that is a reflexive polytope with a flag regular unimodular triangulation. Moreover, the -polynomial of is equal to the -polynomial of a flag triangulation of a sphere. On the other hand, by showing that the Ehrhart polynomial of coincides with the left enriched order polynomial of , it follows from works of Stembridge and Petersen that the -polynomial of is -positive. Stronger, we prove that the -polynomial of is equal to the -polynomial of a flag simplicial complex.
Keywords
Cite
@article{arxiv.1812.02097,
title = {Enriched chain polytopes},
author = {Hidefumi Ohsugi and Akiyoshi Tsuchiya},
journal= {arXiv preprint arXiv:1812.02097},
year = {2020}
}
Comments
11 pages, v2: minor revision