Displaying similar documents to “Bipartite pseudo MV-algebras”

Remarks on pseudo MV-algebras

Ivan Chajda, Miroslav Kolařík (2009)

Discussiones Mathematicae - General Algebra and Applications

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Pseudo MV-algebras (see e.g., [4, 6, 8]) are non-commutative extension of MV-algebras. We show that every pseudo MV-algebra is isomorphic to the algebra of action functions where the binary operation is function composition, zero is x ∧ y and unit is x. Then we define the so-called difference functions in pseudo MV-algebras and show how a pseudo MV-algebra can be reconstructed by them.

Noetherian and Artinian pseudo MV-algebras

Grzegorz Dymek (2008)

Discussiones Mathematicae - General Algebra and Applications

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The notions of Noetherian pseudo MV-algebras and Artinian pseudo MV-algebras are introduced and their characterizations are established. Characterizations of them via fuzzy ideals are also given.

Pseudo-MV algebra of fractions and maximal pseudo-MV algebra of quotients

Dana Piciu (2004)

Open Mathematics

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The aim of this paper is to define the notions of pseudo-MV algebra of fractions and maximal pseudo-MV algebra of quotients for a pseudo-MV algebra (taking as a guide-line the elegant construction of complete ring of quotients by partial morphisms introduced by G. Findlay and J. Lambek-see [14], p.36). For some informal explanations of the notion of fraction see [14], p. 37. In the last part of this paper the existence of the maximal pseudo-MV algebra of quotients for a pseudo-MV algebra...

Direct product decompositions of pseudo MV-algebras

Ján Jakubík (2001)

Archivum Mathematicum

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In this paper we deal with the relations between the direct product decompositions of a pseudo M V -algebra and the direct product decomposicitons of its underlying lattice.

Direct product decompositions of pseudo M V -algebras

Ján Jakubík (2001)

Archivum Mathematicum

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In this paper we deal with the relations between the direct product decompositions of a pseudo M V -algebra and the direct product decomposicitons of its underlying lattice.