English

Two poset polytopes are mutation-equivalent

Combinatorics 2020-02-05 v1

Abstract

The combinatorial mutation mutw(P,F)\mathrm{mut}_w(P,F) for a lattice polytope PP was introduced in the context of mirror symmetry for Fano manifolds in [1]. It was also proved in [1] that for a lattice polytope PNRP \subseteq N_\mathbb{R} containing the origin in its interior, the polar duals PMRP^* \subseteq M_\mathbb{R} and mutw(P,F)MR\mathrm{mut}_w(P,F)^* \subseteq M_\mathbb{R} have the same Ehrhart series. For extending this framework, in this paper, we introduce the combinatorial mutation for the Minkowski sum of rational polytopes and rational polyhedral pointed cones in NRN_\mathbb{R}. We can also introduce the combinatorial mutation in the dual side MRM_\mathbb{R}, which we can apply for every rational polytope in MRM_\mathbb{R} containing the origin (not necessarily in the interior). As an application of this extension of the combinatorial mutation, we prove that the chain polytope of a poset Π\Pi can be obtained by a sequence of the combinatorial mutation in MRM_\mathbb{R} from the order polytope of Π\Pi. Namely, the order polytope and the chain polytope of the same poset Π\Pi are mutation-equivalent.

Keywords

Cite

@article{arxiv.2002.01364,
  title  = {Two poset polytopes are mutation-equivalent},
  author = {Akihiro Higashitani},
  journal= {arXiv preprint arXiv:2002.01364},
  year   = {2020}
}

Comments

14 pages, 2 figures

R2 v1 2026-06-23T13:30:56.576Z