English

Flat $\delta$-vectors and their Ehrhart polynomials

Combinatorics 2020-09-08 v2

Abstract

We call the δ\delta-vector of an integral convex polytope of dimension dd flat if the δ\delta-vector is of the form (1,0,,0,a,,a,0,,0)(1,0,\ldots,0,a,\ldots,a,0,\ldots,0), where a1a \geq 1. In this paper, we give the complete characterization of possible flat δ\delta-vectors. Moreover, for an integral convex polytope PRN\mathcal{P} \subset \mathbb{R}^N of dimension dd, we let i(P,n)=nPZNi(\mathcal{P},n)=|n\mathcal{P} \cap \mathbb{Z}^N| and  i(P,n)=n(PP)ZN.\ i^*(\mathcal{P},n)=|n(\mathcal{P} \setminus \partial \mathcal{P}) \cap \mathbb{Z}^N|. By this characterization, we show that for any d1d \geq 1 and for any k,0k,\ell \geq 0 with k+d1k+\ell \leq d-1, there exist integral convex polytopes P\mathcal{P} and Q\mathcal{Q} of dimension dd such that (i) For t=1,,kt=1,\ldots,k, we have i(P,t)=i(Q,t),i(\mathcal{P},t)=i(\mathcal{Q},t), (ii) For t=1,,t=1,\ldots,\ell, we have i(P,t)=i(Q,t)i^*(\mathcal{P},t)=i^*(\mathcal{Q},t) and (iii) i(P,k+1)i(Q,k+1)i(\mathcal{P},k+1) \neq i(\mathcal{Q},k+1) and i(P,+1)i(Q,+1).i^*(\mathcal{P},\ell+1)\neq i^*(\mathcal{Q},\ell+1).

Keywords

Cite

@article{arxiv.1604.02505,
  title  = {Flat $\delta$-vectors and their Ehrhart polynomials},
  author = {Takayuki Hibi and Akiyoshi Tsuchiya},
  journal= {arXiv preprint arXiv:1604.02505},
  year   = {2020}
}

Comments

7 pages

R2 v1 2026-06-22T13:28:27.521Z