Twisted Brauer monoids
Abstract
We investigate the structure of the twisted Brauer monoid , comparing and contrasting it to the structure of the (untwisted) Brauer monoid . We characterise Green's relations and pre-orders on , describe the lattice of ideals, and give necessary and sufficient conditions for an ideal to be idempotent-generated. We obtain formulae for the rank (smallest size of a generating set) and (where applicable) the idempotent rank (smallest size of an idempotent generating set) of each principal ideal; in particular, when an ideal is idempotent-generated, its rank and idempotent rank are equal. As an application of our results, we also describe the idempotent-generated subsemigroup of (which is not an ideal) as well as the singular ideal of (which is neither principal nor idempotent-generated), and we deduce a result of Maltcev and Mazorchuk that the singular part of the Brauer monoid is idempotent-generated.
Cite
@article{arxiv.1510.08666,
title = {Twisted Brauer monoids},
author = {Igor Dolinka and James East},
journal= {arXiv preprint arXiv:1510.08666},
year = {2016}
}
Comments
v2 - 16 pages, 5 figures (post refereeing, to appear in PRSE). v1 - 17 pages, 7 figures