Two-sided expansions of monoids

Abstract

We initiate the study of expansions of monoids in the class of two-sided restriction monoids and show that generalizations of the Birget-Rhodes prefix group expansion, despite the absence of involution, have rich structure close to that of respective relatively free inverse monoids. For a monoid M, we define FRR(M) to be the freest two-sided restriction monoid generated by a bijective copy, M', of the underlying set of M, such that the inclusion map M FRR(M) is determined by a set of relations, R, so that is a premorphism which is weaker than a homomorphism. Our main result states that FRR(M) can be constructed, by means of a partial action product construction, from M and the idempotent semilattice of FIR(M), the free M'-generated inverse monoid subject to relations R. In particular, the semilattice of projections of FRR(M) is isomorphic to the idempotent semilattice of FIR(M). The result by Fountain, Gomes and Gould on the structure of the free two-sided restriction monoid is recovered as a special case of our result. We show that important properties of FRR(M) are well agreed with suitable properties of M, such as being cancellative or embeddable into a group. We observe that if M is an inverse monoid, then FIs(M), the free inverse monoid with respect to strong premorphisms, is isomorphic to the Lawson-Margolis-Steinberg generalized prefix expansion Mpr. This gives a presentation of Mpr and leads to a model for FRs(M) in terms of the known model for Mpr.