Twisted Brauer monoids

Abstract

We investigate the structure of the twisted Brauer monoid Bnτ, comparing and contrasting it to the structure of the (untwisted) Brauer monoid Bn. We characterise Green's relations and pre-orders on Bnτ, 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 Bnτ (which is not an ideal) as well as the singular ideal of Bnτ (which is neither principal nor idempotent-generated), and we deduce a result of Maltcev and Mazorchuk that the singular part of the Brauer monoid Bn is idempotent-generated.