English

Examples and counterexamples in Ehrhart theory

Combinatorics 2024-08-23 v4 Commutative Algebra Rings and Algebras

Abstract

This article provides a comprehensive exposition about inequalities that the coefficients of Ehrhart polynomials and hh^*-polynomials satisfy under various assumptions. We pay particular attention to the properties of Ehrhart positivity as well as unimodality, log-concavity and real-rootedness for hh^*-polynomials. We survey inequalities that arise when the polytope has different normality properties. We include statements previously unknown in the Ehrhart theory setting, as well as some original contributions in this topic. We address numerous variations of the conjecture asserting that IDP polytopes have a unimodal hh^*-polynomial, and construct concrete examples that show that these variations of the conjecture are false. Explicit emphasis is put on polytopes arising within algebraic combinatorics. Furthermore, we describe and construct polytopes having pathological properties on their Ehrhart coefficients and roots, and we indicate for the first time a connection between the notions of Ehrhart positivity and hh^*-real-rootedness. We investigate the log-concavity of the sequence of evaluations of an Ehrhart polynomial at the non-negative integers. We conjecture that IDP polytopes have a log-concave Ehrhart series. Many additional problems and challenges are proposed.

Keywords

Cite

@article{arxiv.2307.10852,
  title  = {Examples and counterexamples in Ehrhart theory},
  author = {Luis Ferroni and Akihiro Higashitani},
  journal= {arXiv preprint arXiv:2307.10852},
  year   = {2024}
}

Comments

44 pages. To appear in EMS Surveys in Mathematical Sciences

R2 v1 2026-06-28T11:35:53.727Z