Balanced residuated partially ordered semigroups

Abstract

A residuated semigroup is a structure A,,·,,/ where A, is a poset and A,· is a semigroup such that the residuation law x· y z x z/y y x z holds. An element p is positive if a pa and a ap for all a. A residuated semigroup is called balanced if it satisfies the equation x x ≈ x / x and moreover each element of the form a a = a / a is positive, and it is called integrally closed if it satisfies the same equation and moreover each element of this form is a global identity. We show how a wide class of balanced residuated semigroups (so-called steady residuated semigroups) can be decomposed into integrally closed pieces, using a generalization of the classical Plonka sum construction. This generalization involves gluing a disjoint family of ordered algebras together using multiple families of maps, rather than a single family as in ordinary Plonka sums.