English

Decomposition theorem on matchable distributive lattices

Combinatorics 2015-03-09 v1

Abstract

A distributive lattice structure M(G){\mathbf M}(G) has been established on the set of perfect matchings of a plane bipartite graph GG. We call a lattice {\em matchable distributive lattice} (simply MDL) if it is isomorphic to such a distributive lattice. It is natural to ask which lattices are MDLs. We show that if a plane bipartite graph GG is elementary, then M(G){\mathbf M}(G) is irreducible. Based on this result, a decomposition theorem on MDLs is obtained: a finite distributive lattice L\mathbf{L} is an MDL if and only if each factor in any cartesian product decomposition of L\mathbf{L} is an MDL. Two types of MDLs are presented: J(m×n)J(\mathbf{m}\times \mathbf{n}) and J(T)J(\mathbf{T}), where m×n\mathbf{m}\times \mathbf{n} denotes the cartesian product between mm-element chain and nn-element chain, and T\mathbf{T} is a poset implied by any orientation of a tree.

Keywords

Cite

@article{arxiv.1008.2818,
  title  = {Decomposition theorem on matchable distributive lattices},
  author = {Heping Zhang and Dewu Yang and Haiyuan Yao},
  journal= {arXiv preprint arXiv:1008.2818},
  year   = {2015}
}

Comments

19 pages, 7 figures

R2 v1 2026-06-21T16:01:42.917Z