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Quasi-subtractive varieties

Published online by Cambridge University Press:  12 March 2014

Tomasz Kowalski ,
Francesco Paoli  and
Matthew Spinks
Tomasz Kowalski
Affiliation:
Department of Mathematics and Statistics, University of Melbourne, Melbourne, Australia, E-mail: tomaszk@unimelb.edu.au
Francesco Paoli
Affiliation:
Department of Education, University of Cagliari, Cagliari, Italy, E-mail: paoli@unica.it
Matthew Spinks
Affiliation:
Department of Education, University of Cagliari, Cagliari, Italy, E-mail: mspinksau@yahoo.com.au
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Abstract

Varieties like groups, rings, or Boolean algebras have the property that, in any of their members, the lattice of congruences is isomorphic to a lattice of more manageable objects, for example normal subgroups of groups, two-sided ideals of rings, filters (or ideals) of Boolean algebras. Abstract algebraic logic can explain these phenomena at a rather satisfactory level of generality: in every member A of a τ-regular variety the lattice of congruences of A is isomorphic to the lattice of deductive filters on A of the τ-assertional logic of . Moreover, if has a constant 1 in its type and is 1-subtractive, the deductive filters on A of the 1-assertional logic of coincide with the -ideals of A in the sense of Gumm and Ursini, for which we have a manageable concept of ideal generation.

However, there are isomorphism theorems, for example, in the theories of residuated lattices, pseudointerior algebras and quasi-MV algebras that cannot be subsumed by these general results. The aim of the present paper is to appropriately generalise the concepts of subtractivity and τ-regularity in such a way as to shed some light on the deep reason behind such theorems. The tools and concepts we develop hereby provide a common umbrella for the algebraic investigation of several families of logics, including substructural logics, modal logics, quantum logics, and logics of constructive mathematics.

Type
Research Article
Information
The Journal of Symbolic Logic , Volume 76 , Issue 4 , December 2011 , pp. 1261 - 1286
Copyright
Copyright © Association for Symbolic Logic 2011

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