Retractions of free MV-algebras and unital -groups

Abstract

A number of papers deal with the problem of counting the number of retractions of a structure S onto a substructure T. In the particular case when S is a free algebra, this number is ≥ 1 iff T is projective. In this paper we consider the case when T is a projective lattice-ordered abelian group with a distinguished strong order unit, or equivalently, a projective MV-algebra. Let A be a retract of the free n-generator MV-algebra M([0,1]n) of McNaughton functions on [0,1]n. We prove that the number r(A) of retractions of M([0,1]n) onto A is finite if, and only if, the maximal spectral space μA is homeomorphic to a (Kuratowski) closed domain M of [0,1]n, in the sense that M=cl(int(M)). Further, the closed domain condition is decidable and r(A) is computable, once a retraction onto A is explicitly given. Thus every finitely generated projective MV-algebra B comes equipped with a new invariant (B)=\r(A) A B for A a retract of M([0,1]k) \, where k is the smallest number of generators of B. We compute (B) for many projective MV-algebras B considered in the literature. Various problems concerning retractions of free MV-algebras are shown to be decidable. Via the functor, our results and computations automatically transfer to finitely generated projective abelian -groups with a distinguished strong unit.