The associative-poset point of view on right regular bands

Abstract

We present two results on the relation between the class of right regular bands (RRBs) and their underlying *associative posets*. The first one is a construction of a left adjoint to the forgetful functor that takes an RRB (P,·) to the corresponding (P,≤). The construction of such a left adjoint is actually done in general for any class of relational structures (X,R) obtained from a variety, where R is defined by a finite conjunction of identities. The second result generalizes the "inner" representations of direct product decompositions of semilattices studied by the second author to RRBs having at least one commuting element.

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