Categorical Equivalence Between $$\varvec{PMV}{\varvec{f}}PMVfProductAlgebrasandSemiLow PMV f -Product Algebras and Semi-Low \varvec{f}{\varvec{u}}$$ f u -Rings

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Studia Logica 107 (6):1135-1158 (2019)
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Abstract

An explicit categorical equivalence is defined between a proper subvariety of the class of \-algebras, as defined by Di Nola and Dvurečenskij, to be called \-algebras, and the category of semi-low \-rings. This categorical representation is done using the prime spectrum of the \-algebras, through the equivalence between \-algebras and \-groups established by Mundici, from the perspective of the Dubuc–Poveda approach, that extends the construction defined by Chang on chains. As a particular case, semi-low \-rings associated to Boolean algebras are characterized.

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10.1007/s11225-018-9832-6

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Lilian Cruz
Universidade Federal do Rio de Janeiro

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An algebraic approach to propositional fuzzy logic.Franco Montagna - 2000 - Journal of Logic, Language and Information 9 (1):91-124.
Representation theory of MV-algebras.Eduardo J. Dubuc & Yuri A. Poveda - 2010 - Annals of Pure and Applied Logic 161 (8):1024-1046.

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