Maximal Chains in Bond Lattices

Shreya Ahirwar; Susanna Fishel; Parikshita Gya; Pamela E. Harris; Nguyen Pham; Andrés R. Vindas-Meléndez; Dan Khanh Vo

doi:10.37236/10983

Maximal Chains in Bond Lattices

Shreya Ahirwar, Susanna Fishel, Parikshita Gya, Pamela E. Harris, Nguyen Pham, Andrés R. Vindas-Meléndez, Dan Khanh Vo

Research output: Contribution to journal › Article › peer-review

Abstract

Let G be a graph with vertex set {1, 2, …, n}. Its bond lattice, BL(G), is a sublattice of the set partition lattice. The elements of BL(G) are the set partitions whose blocks induce connected subgraphs of G. In this article, we consider graphs G whose bond lattice consists only of non-crossing partitions. We define a family of graphs, called triangulation graphs, with this property and show that any two produce isomorphic bond lattices. We then look at the enumeration of the maximal chains in the bond lattices of triangulation graphs. Stanley’s map from maximal chains in the noncrossing partition lattice to parking functions was our motivation. We find the restriction of his map to the bond lattice of certain subgraphs of triangulation graphs. Finally, we show the number of maximal chains in the bond lattice of a triangulation graph is the number of ordered cycle decompositions.

Original language	English (US)
Article number	#P3.11
Journal	Electronic Journal of Combinatorics
Volume	29
Issue number	3
DOIs	https://doi.org/10.37236/10983
State	Published - 2022
Externally published	Yes

ASJC Scopus subject areas

Theoretical Computer Science
Geometry and Topology
Discrete Mathematics and Combinatorics
Computational Theory and Mathematics
Applied Mathematics

Access to Document

10.37236/10983

Cite this

@article{f6a3b7096a8947bea6953fa18340a60e,

title = "Maximal Chains in Bond Lattices",

abstract = "Let G be a graph with vertex set {1, 2, …, n}. Its bond lattice, BL(G), is a sublattice of the set partition lattice. The elements of BL(G) are the set partitions whose blocks induce connected subgraphs of G. In this article, we consider graphs G whose bond lattice consists only of non-crossing partitions. We define a family of graphs, called triangulation graphs, with this property and show that any two produce isomorphic bond lattices. We then look at the enumeration of the maximal chains in the bond lattices of triangulation graphs. Stanley{\textquoteright}s map from maximal chains in the noncrossing partition lattice to parking functions was our motivation. We find the restriction of his map to the bond lattice of certain subgraphs of triangulation graphs. Finally, we show the number of maximal chains in the bond lattice of a triangulation graph is the number of ordered cycle decompositions.",

author = "Shreya Ahirwar and Susanna Fishel and Parikshita Gya and Harris, {Pamela E.} and Nguyen Pham and Vindas-Mel{\'e}ndez, {Andr{\'e}s R.} and Vo, {Dan Khanh}",

note = "Funding Information: ∗S. Fishel is partially supported by Simons Collaboration Grants 359602 and 709671. †P. E. Harris was supported by a Karen Uhlenbeck EDGE Fellowship. ‡A. R. Vindas-Mel{\'e}ndez was supported by the NSF under Award DMS-2102921. Publisher Copyright: {\textcopyright} The authors.",

year = "2022",

doi = "10.37236/10983",

language = "English (US)",

volume = "29",

journal = "Electronic Journal of Combinatorics",

issn = "1077-8926",

publisher = "Electronic Journal of Combinatorics",

number = "3",

}

TY - JOUR

T1 - Maximal Chains in Bond Lattices

AU - Ahirwar, Shreya

AU - Fishel, Susanna

AU - Gya, Parikshita

AU - Harris, Pamela E.

AU - Pham, Nguyen

AU - Vindas-Meléndez, Andrés R.

AU - Vo, Dan Khanh

N1 - Funding Information: ∗S. Fishel is partially supported by Simons Collaboration Grants 359602 and 709671. †P. E. Harris was supported by a Karen Uhlenbeck EDGE Fellowship. ‡A. R. Vindas-Meléndez was supported by the NSF under Award DMS-2102921. Publisher Copyright: © The authors.

PY - 2022

Y1 - 2022

N2 - Let G be a graph with vertex set {1, 2, …, n}. Its bond lattice, BL(G), is a sublattice of the set partition lattice. The elements of BL(G) are the set partitions whose blocks induce connected subgraphs of G. In this article, we consider graphs G whose bond lattice consists only of non-crossing partitions. We define a family of graphs, called triangulation graphs, with this property and show that any two produce isomorphic bond lattices. We then look at the enumeration of the maximal chains in the bond lattices of triangulation graphs. Stanley’s map from maximal chains in the noncrossing partition lattice to parking functions was our motivation. We find the restriction of his map to the bond lattice of certain subgraphs of triangulation graphs. Finally, we show the number of maximal chains in the bond lattice of a triangulation graph is the number of ordered cycle decompositions.

AB - Let G be a graph with vertex set {1, 2, …, n}. Its bond lattice, BL(G), is a sublattice of the set partition lattice. The elements of BL(G) are the set partitions whose blocks induce connected subgraphs of G. In this article, we consider graphs G whose bond lattice consists only of non-crossing partitions. We define a family of graphs, called triangulation graphs, with this property and show that any two produce isomorphic bond lattices. We then look at the enumeration of the maximal chains in the bond lattices of triangulation graphs. Stanley’s map from maximal chains in the noncrossing partition lattice to parking functions was our motivation. We find the restriction of his map to the bond lattice of certain subgraphs of triangulation graphs. Finally, we show the number of maximal chains in the bond lattice of a triangulation graph is the number of ordered cycle decompositions.

UR - http://www.scopus.com/inward/record.url?scp=85134500471&partnerID=8YFLogxK

UR - http://www.scopus.com/inward/citedby.url?scp=85134500471&partnerID=8YFLogxK

U2 - 10.37236/10983

DO - 10.37236/10983

M3 - Article

AN - SCOPUS:85134500471

SN - 1077-8926

VL - 29

JO - Electronic Journal of Combinatorics

JF - Electronic Journal of Combinatorics

IS - 3

M1 - #P3.11

ER -

Maximal Chains in Bond Lattices

Abstract

ASJC Scopus subject areas

Access to Document

Other files and links

Fingerprint

Cite this