Title of article
Ultraproducts of Z with an Application to Many-Valued Logics
Author/Authors
Joan Gispert i Bras?، نويسنده , , Daniele Mundici، نويسنده , , Antoni Torrens Torrell، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1999
Pages
20
From page
214
To page
233
Abstract
Up to categorical equivalence, abelian lattice-ordered groups with strong unit coincide with Changʹs MV-algebras—the Lindenbaum algebras of the infinite-valued ukasiewicz calculus. While the property of being a strong unit is not definable even in first-order logic, MV-algebras form an equational class. On the other hand, the addition operation and the translation invariant lattice order of a lattice-ordered group are more amenable than the truncated addition operation of an MV-algebra. In this paper MV-algebraic and group-theoretical techniques are combined to classify and axiomatize all universal classes generated by an infinite totally ordered MV-algebra A such that the quotient of A by its unique maximal ideal is finite. The number of elements of this quotient, and that of the largest finite subalgebra of A turns out to be a complete classifier. The main tool for our results is given by order preserving embeddings of totally ordered groups G into ultrapowers of the additive group of integers, that also preserve the nondivisibility properties of prescribed elements of G.
Journal title
Journal of Algebra
Serial Year
1999
Journal title
Journal of Algebra
Record number
694677
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