Congruence lattices of finite diagram monoids

James East; James D. Mitchell; Nik Ruskuc; Michael Torpey

Congruence lattices of finite diagram monoids

James East, James D. Mitchell, Nik Ruskuc, Michael Torpey

Western Sydney University

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

20 Citations (Scopus)

Abstract

We give a complete description of the congruence lattices of the following finite diagram monoids: the partition monoid, the planar partition monoid, the Brauer monoid, the Jones monoid (also known as the Temperley-Lieb monoid), the Motzkin monoid, and the partial Brauer monoid. All the congruences under discussion arise as special instances of a new construction, involving an ideal I, a retraction I -> M onto the minimal ideal, a congruence on M, and a normal subgroup of a maximal subgroup outside I.

Original language	English
Pages (from-to)	931-1003
Number of pages	73
Journal	Advances in Mathematics
Volume	333
Publication status	Published - 31 Jul 2018

Bibliographical note

Publisher Copyright:
© 2018 Elsevier Inc.

Keywords

congruence lattices
idempotents
monoids
semigroup algebras
transformations (mathematics)

Cite this

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T1 - Congruence lattices of finite diagram monoids

AU - East, James

AU - Mitchell, James D.

AU - Ruskuc, Nik

AU - Torpey, Michael

PY - 2018/7/31

Y1 - 2018/7/31

N2 - We give a complete description of the congruence lattices of the following finite diagram monoids: the partition monoid, the planar partition monoid, the Brauer monoid, the Jones monoid (also known as the Temperley-Lieb monoid), the Motzkin monoid, and the partial Brauer monoid. All the congruences under discussion arise as special instances of a new construction, involving an ideal I, a retraction I -> M onto the minimal ideal, a congruence on M, and a normal subgroup of a maximal subgroup outside I.

AB - We give a complete description of the congruence lattices of the following finite diagram monoids: the partition monoid, the planar partition monoid, the Brauer monoid, the Jones monoid (also known as the Temperley-Lieb monoid), the Motzkin monoid, and the partial Brauer monoid. All the congruences under discussion arise as special instances of a new construction, involving an ideal I, a retraction I -> M onto the minimal ideal, a congruence on M, and a normal subgroup of a maximal subgroup outside I.

KW - congruence lattices

KW - idempotents

KW - monoids

KW - semigroup algebras

KW - transformations (mathematics)

UR - http://handle.westernsydney.edu.au:8081/1959.7/uws:47893

M3 - Article

SN - 1930-5346

VL - 333

SP - 931

EP - 1003

JO - Advances in Mathematics

JF - Advances in Mathematics

ER -

Congruence lattices of finite diagram monoids

Abstract

Bibliographical note

Keywords

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Cite this