English

Partial permutohedra

Combinatorics 2025-07-24 v3

Abstract

Partial permutohedra are lattice polytopes which were recently introduced and studied by Heuer and Striker. For positive integers mm and nn, the partial permutohedron P(m,n)\mathcal{P}(m,n) is the convex hull of all vectors in {0,1,,n}m\{0,1,\ldots,n\}^m whose nonzero entries are distinct. We study the face lattice, volume and Ehrhart polynomial of P(m,n)\mathcal{P}(m,n), and our methods and results include the following. For any mm and nn, we obtain a bijection between the nonempty faces of P(m,n)\mathcal{P}(m,n) and certain chains of subsets of {1,,m}\{1,\dots,m\}, thereby confirming a conjecture of Heuer and Striker, and we then use this characterization of faces to obtain a closed expression for the hh-polynomial of P(m,n)\mathcal{P}(m,n). For any mm and nn with nm1n\ge m-1, we use a pyramidal subdivision of P(m,n)\mathcal{P}(m,n) to establish a recursive formula for the normalized volume of P(m,n)\mathcal{P}(m,n), from which we then obtain closed expressions for this volume. We also use a sculpting process (in which P(m,n)\mathcal{P}(m,n) is reached by successively removing certain pieces from a simplex or hypercube) to obtain closed expressions for the Ehrhart polynomial of P(m,n)\mathcal{P}(m,n) with arbitrary mm and fixed n3n\le 3, the normalized volume of P(m,4)\mathcal{P}(m,4) with arbitrary mm, and the Ehrhart polynomial of P(m,n)\mathcal{P}(m,n) with fixed m4m\le4 and arbitrary nm1n\ge m-1.

Keywords

Cite

@article{arxiv.2207.14253,
  title  = {Partial permutohedra},
  author = {Roger E. Behrend and Federico Castillo and Anastasia Chavez and Alexander Diaz-Lopez and Laura Escobar and Pamela E. Harris and Erik Insko},
  journal= {arXiv preprint arXiv:2207.14253},
  year   = {2025}
}

Comments

42 pages, 5 figures. Final version, to appear in Discrete & Computational Geometry

R2 v1 2026-06-25T01:18:44.220Z