Title of article
Formal systems of fuzzy logic and their fragments
Author/Authors
Cintula، نويسنده , , Petr and H?jek، نويسنده , , Petr and Hor??k، نويسنده , , Rostislav، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2007
Pages
26
From page
40
To page
65
Abstract
Formal systems of fuzzy logic (including the well-known Łukasiewicz and Gödel–Dummett infinite-valued logics) are well-established logical systems and respected members of the broad family of the so-called substructural logics closely related to the famous logic BCK. The study of fragments of logical systems is an important issue of research in any class of non-classical logics. Here we study the fragments of nine prominent fuzzy logics to all sublanguages containing implication. However, the results achieved in the paper for those nine logics are usually corollaries of theorems with much wider scope of applicability. In particular, we show how many of these fragments are really distinct and we find axiomatic systems for most of them. In fact, we construct strongly separable axiomatic systems for eight of our nine logics. We also fully answer the question for which of the studied fragments the corresponding class of algebras forms a variety. Finally, we solve the problem how to axiomatize predicate versions of logics without the lattice disjunction (an essential connective in the usual axiomatic system of fuzzy predicate logics).
Keywords
Mathematical fuzzy logic , BCK-algebras , BCK , FBCK , Monoidal t -norm based logic
Journal title
Annals of Pure and Applied Logic
Serial Year
2007
Journal title
Annals of Pure and Applied Logic
Record number
1443901
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