F-birestriction monoids in enriched signature

Abstract

Motivated by recent interest to F-inverse monoids, on the one hand, and to restriction and birestriction monoids, on the other hand, we initiate the study of F-birestriction monoids as algebraic structures in the enriched signature (·, \, *, \,+, \, m,1) where the unary operation (·)m maps each element to the maximum element of its σ-class. We find a presentation of the free F-birestriction monoid FFBR(X) as a birestriction monoid F over the extended set of generators XX+ where X+ is a set in a bijection with the free semigroup X+ and encodes the maximum elements of (non-projection) σ-classes. This enables us to show that FFBR(X) decomposes as the partial action product E( I) X* of the idempotent semilattice of the universal inverse monoid I of F partially acted upon by the free monoid X*. Invoking Sch\"utzenberger graphs, we prove that the word problem for FFBR(X) and its strong and perfect analogues is decidable. Furthermore, we show that FFBR(X) does not admit a geometric model based on a quotient of the Margolis-Meakin expansion M(FG(X), X X+) over the free group FG(X), but the free perfect X-generated F-birestriction monoid admits such a model.

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