English

Completing and extending shellings of vertex decomposable complexes

Combinatorics 2023-08-11 v3 Commutative Algebra

Abstract

We say that a pure dd-dimensional simplicial complex Δ\Delta on nn vertices is \emph{shelling completable} if Δ\Delta can be realized as the initial sequence of some shelling of Δn1(d)\Delta_{n-1}^{(d)}, the dd-skeleton of the (n1)(n-1)-dimensional simplex. A well-known conjecture of Simon posits that any shellable complex is shelling completable. In this note we prove that vertex decomposable complexes are shelling completable. In fact we show that if Δ\Delta is a vertex decomposable complex then there exists an ordering of its ground set VV such that adding the revlex smallest missing (d+1)(d+1)-subset of VV results in a complex that is again vertex decomposable. We explore applications to matroids and shifted complexes, as well as connections to ridge-chordal complexes and kk-decomposability. We also show that if Δ\Delta is a dd-dimensional complex on at most d+3d+3 vertices then the notions of shellable, vertex decomposable, shelling completable, and extendably shellable are all equivalent.

Keywords

Cite

@article{arxiv.2011.12225,
  title  = {Completing and extending shellings of vertex decomposable complexes},
  author = {Michaela Coleman and Anton Dochtermann and Nathan Geist and Suho Oh},
  journal= {arXiv preprint arXiv:2011.12225},
  year   = {2023}
}

Comments

13 pages; v2: Fixed some typos and other minor revisions, expanded Remark 3.8; v3: added Section 2.1 connecting our work to ridge chordal complexes, other corrections and minor revisions incorporating comments from referees

R2 v1 2026-06-23T20:28:53.992Z