Unimodality on $\delta$-vectors of lattice polytopes and two related properties

TL;DR

This paper explores the unimodality, log-concavity, and alternatingly increasing properties of $\

Contribution

It establishes bounds for when dilated lattice polytopes have strictly log-concave and alternatingly increasing $\\delta$-vectors, and provides various examples illustrating different unimodality properties.

Findings

Dilated polytopes $n\\mathcal{P}$ have strictly log-concave and alternatingly increasing $\\delta$-vectors if $n > \\max\\{s,d+1-s\\\\}$.

Examples of lattice polytopes with non-unimodal, unimodal but not log-concave, alternatingly increasing but not log-concave, and log-concave but not alternatingly increasing $\\delta$-vectors.

Abstract

In this paper, we investigate two properties concerning the unimodality of the $\delta$-vectors of lattice polytopes, which are log-concavity and alternatingly increasingness. For lattice polytopes $\mathcal{P}$ of dimension $d$, we prove that the dilated lattice polytopes $n\mathcal{P}$ have strictly log-concave and strictly alternatingly increasing $\delta$-vectors if $n > \max\{s,d+1-s\}$, where $s$ is the degree of the $\delta$-polynomial of $\mathcal{P}$. The bound $\max\{s,d+1-s\}$ for $n$ is reasonable. We also provide several kinds of unimodal (or non-unimodal) $\delta$-vectors. Concretely, we give examples of lattice polytoeps whose $\delta$-vectors are not unimodal, unimodal but neither log-concave nor alternatingly increasing, alternatingly increasing but not log-concave, and log-concave but not alternatingly increasing, respectively.