Non-classical logics and their applications to fuzzy subsets : a handbook of the mathematical foundations of fuzzy set theory
edited by Ulrich Höhle and Erich Peter Klement.
Dordrecht : Kluwer Academic Publishers, ©1995.
viii, 390 págs. : ilustraciones ; 25 cm.
Serie: Theory and decision library. Series B, Mathematical and statistical methods ; v. 32
ISBN: 079233194X
"Proceedings of the 14th Linz Seminar on Fuzzy Set Theory ... [held] the second week of September 1992 at the Bildungszentrum St. Magdalena (Linz, Austria)"—Foreword.
Incluye referencias bibliográficas e índice.
Reseña: MathSciNet, 96c:03005
Contenido
- Part A. Algebraic foundations of non-classical logics: L. P. Belluce, $\alpha$-complete MV-algebras
- A. Di Nola and S. Sessa, On MV-algebras of continuous functions
- R. Grigolia, Free and projective Heyting and monadic Heyting algebras
- U. Höhle, Commutative, residuated $l$-monoids
- D. Mundici and M. Pasquetto, A proof of the completeness of the infinite-valued calculus of \L ukasiewicz with one variable
- Part B. Non-classical models and topos-like categories: U. Höhle, Presheaves over GL-monoids
- C. J. Mulvey and M. Nawaz, Quantales: quantal sets
- L. N. Stout, Categories of fuzzy sets with values in a quantale or projectale
- O. Wyler, Fuzzy logic and categories of fuzzy sets
- Part C. General aspects of non-classical logics: F. Klawonn, Prolog extensions to many-valued logics
- L. J. Kohout, Epistemological aspects of many-valued logics and fuzzy structures
- V. Novák, Ultraproduct theorem and recursive properties of fuzzy logic.