AbstractWe generalize the notion of an MV-algebra in the context of residuated lattices to include non-commutative and unbounded structures. We investigate a number of their properties and prove that they can be obtained from lattice-ordered groups via a truncation construction that generalizes the Chang–Mundici Γ functor. This correspondence extends to a categorical equivalence that generalizes the ones established by D. Mundici and A. Dvurečenskij. The decidability of the equational theory of the variety of generalized MV-algebras follows from our analysis
We investigate the structure of perfect residuated lattices, focussing especially on perfect pseudo ...
We provide a generalization of Mundici’s equivalence between unital Abelian lattice-ordered groups a...
In this paper we expand previous results obtained in [2] about the study of categorical equivalence ...
summary:In the present paper we deal with generalized $MV$-algebras ($GMV$-algebras, in short) in th...
Abstract. We deal with unbounded dually residuated lattices that generalize pseudo MV-algebras in su...
An equivalence between the category of MV-algebras and the category MV∙ is given in Castiglioni et a...
summary:We deal with unbounded dually residuated lattices that generalize pseudo $MV$-algebras in su...
We investigate the geometric theory of local MV-algebras and its quotients axiomatizing the local MV...
We introduce the notion of generalized rotation of a residuated lattice and characterize the varieti...
AbstractUp to categorical equivalence,MV-algebras are unit intervals of abelian lattice-ordered grou...
We establish, generalizing Di Nola and Lettieri's categorical equivalence, a Morita-equivalence betw...
summary:Generalized MV-algebras (= GMV-algebras) are non-commutative generalizations of MV-algebras....
Abstract. Cancellative residuated lattices are a natural general-ization of lattice-ordered groups (...
In this paper, we investigate the relationships between lattice-groups and two types of pseudo MV-al...
We investigate the structure of perfect residuated lattices, focussing especially on perfect pseudo ...
We provide a generalization of Mundici’s equivalence between unital Abelian lattice-ordered groups a...
In this paper we expand previous results obtained in [2] about the study of categorical equivalence ...
summary:In the present paper we deal with generalized $MV$-algebras ($GMV$-algebras, in short) in th...
Abstract. We deal with unbounded dually residuated lattices that generalize pseudo MV-algebras in su...
An equivalence between the category of MV-algebras and the category MV∙ is given in Castiglioni et a...
summary:We deal with unbounded dually residuated lattices that generalize pseudo $MV$-algebras in su...
We investigate the geometric theory of local MV-algebras and its quotients axiomatizing the local MV...
We introduce the notion of generalized rotation of a residuated lattice and characterize the varieti...
AbstractUp to categorical equivalence,MV-algebras are unit intervals of abelian lattice-ordered grou...
We establish, generalizing Di Nola and Lettieri's categorical equivalence, a Morita-equivalence betw...
summary:Generalized MV-algebras (= GMV-algebras) are non-commutative generalizations of MV-algebras....
Abstract. Cancellative residuated lattices are a natural general-ization of lattice-ordered groups (...
In this paper, we investigate the relationships between lattice-groups and two types of pseudo MV-al...
We investigate the structure of perfect residuated lattices, focussing especially on perfect pseudo ...
We provide a generalization of Mundici’s equivalence between unital Abelian lattice-ordered groups a...
In this paper we expand previous results obtained in [2] about the study of categorical equivalence ...