English

Maximal chain descent orders

Combinatorics 2022-10-03 v1

Abstract

This paper introduces a partial order on the maximal chains of any finite bounded poset PP which has a CL-labeling λ\lambda. We call this the maximal chain descent order induced by λ\lambda, denoted Pλ(2)P_{\lambda}(2). As a first example, letting PP be the Boolean lattice and λ\lambda its standard EL-labeling gives Pλ(2)P_{\lambda}(2) isomorphic to the weak order of type A. We discuss in depth other seemingly well-structured examples: the max-min EL-labeling of the partition lattice gives maximal chain descent order isomorphic to a partial order on certain labeled trees, and particular cases of the linear extension EL-labelings of finite distributive lattices produce maximal chain descent orders isomorphic to partial orders on standard Young tableaux. We observe that the order relations which one might expect to be the cover relations, those given by the "polygon moves" whose transitive closure defines the maximal chain descent order, are not always cover relations. Several examples illustrate this fact. Nonetheless, we characterize the EL-labelings for which every polygon move gives a cover relation, and we prove many well known EL-labelings do have the expected cover relations. One motivation for Pλ(2)P_{\lambda}(2) is that its linear extensions give all of the shellings of the order complex of PP whose restriction maps are defined by the descents with respect to λ\lambda. This yields strictly more shellings of PP than the lexicographic ones induced by λ\lambda. Thus, the maximal chain descent order Pλ(2)P_{\lambda}(2) might be thought of as encoding the structure of the set of shellings induced by λ\lambda.

Keywords

Cite

@article{arxiv.2209.15142,
  title  = {Maximal chain descent orders},
  author = {Stephen Lacina},
  journal= {arXiv preprint arXiv:2209.15142},
  year   = {2022}
}

Comments

48 pages, 21 figures

R2 v1 2026-06-28T02:25:05.939Z