English

Hypersimplicial subdivisions

Combinatorics 2021-11-05 v1

Abstract

Let π:RnRd\pi:{\mathbb R}^n \to {\mathbb R}^d be any linear projection, let AA be the image of the standard basis. Motivated by Postnikov's study of postitive Grassmannians via plabic graphs and Galashin's connection of plabic graphs to slices of zonotopal tilings of 3-dimensional cyclic zonotopes, we study the poset of subdivisions induced by the restriction of π\pi to the kk-th hypersimplex, for k=1,,n1k=1,\dots,n-1. We show that: - For arbitrary AA and for kd+1k\le d+1, the corresponding fiber polytope F(k)(A)\mathcal F^{(k)}(A) is normally isomorphic to the Minkowski sum of the secondary polytopes of all subsets of AA of size max{d+2,nk+1}\max\{d+2,n-k+1\}. - When A=PnA={\mathbf P}_n is the vertex set of an nn-gon, we answer the Baues question in the positive: the inclusion of the poset of π\pi-coherent subdivisions into the poset of all π\pi-induced subdivisions is a homotopy equivalence. - When A=C(n,d)A=\mathbf{C}(n,d) is the vertex set of a cyclic dd-polytope with dd odd and any nd+3n \ge d+3, there are non-lifting (and even more so, non-separated) π\pi-induced subdivisions for k=2k=2.

Keywords

Cite

@article{arxiv.1906.05764,
  title  = {Hypersimplicial subdivisions},
  author = {Jorge Alberto Olarte and Francisco Santos},
  journal= {arXiv preprint arXiv:1906.05764},
  year   = {2021}
}

Comments

27 pages, 8 figures

R2 v1 2026-06-23T09:52:56.172Z