On Special Inverse Monoids with the Strong F-Inverse Property

Abstract

An inverse monoid S is called F-inverse if each σ-class of S, where σ is the minimum group congruence of S, has a maximum element with respect to the natural order of S. Since the property of an inverse monoid being F-inverse immediately implies that it must be E-unitary, it follows that every X-generated F-inverse monoid with canonical maximum group image G must be isomorphic to a quotient of the Margolis-Meakin expansion M(G,X). If this is realised in such a way that all the maximal elements of each σ-class of M(G,X) get identified, thus producing the top element of the corresponding σ-class of S, we say that S is strongly F-inverse. Consequently, there is a universal X-generated inverse monoid MsF(G,X) with maximum group image G and the strongly F-inverse property. We provide a presentation for this inverse monoid and show it can be further simplified upon introducing additional assumptions on the group G (which will include all one-relator groups). We use this to provide a full description of all one-relator special inverse monoids with a cyclically reduced relator word that are strongly F-inverse. We also discuss some further examples and non-examples.