Equivalence \`a la Mundici for commutative lattice-ordered monoids

Abstract

We provide a generalization of Mundici's equivalence between unital Abelian lattice-ordered groups and MV-algebras: the category of unital commutative lattice-ordered groups is equivalent to the category of MV-monoidal algebras. Roughly speaking, the structures we call unital commutative lattice-ordered groups are unital Abelian lattice-ordered groups without the unary operation x -x. The primitive operations are +, , , 0, 1, -1. A prime example of these structures is R, with the obvious interpretation of the operations. Analogously, MV-monoidal algebras are MV-algebras without the negation x x. The primitive operations are , , , , 0, 1. A motivating example of MV-monoidal algebra is the negation-free reduct of the standard MV-algebra [0, 1] ⊂eq R. We obtain the original Mundici's equivalence as a corollary of our main result.