Proof Theory for Fuzzy Logics

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Fuzzy logics are many-valued logics that are well suited to reasoning in the context of vagueness. They provide the basis for the wider field of Fuzzy Logic, encompassing diverse areas such as fuzzy control, fuzzy databases, and fuzzy mathematics. This book provides an accessible and up-to-date introduction to this fast-growing and increasingly popular area. It focuses in particular on the development and applications of "proof-theoretic" presentations of fuzzy logics; the result of more than ten years of intensive work by researchers in the area, including the authors. In addition to providing alternative elegant presentations of fuzzy logics, proof-theoretic methods are useful for addressing theoretical problems (including key standard completeness results) and developing efficient deduction and decision algorithms. Proof-theoretic presentations also place fuzzy logics in the broader landscape of non-classical logics, revealing deep relations with other logics studied in Computer Science, Mathematics, and Philosophy. The book builds methodically from the semantic origins of fuzzy logics to proof-theoretic presentations such as Hilbert and Gentzen systems, introducing both theoretical and practical applications of these presentations.

Author(s): George Metcalfe, Nicola Olivetti, Dov Gabbay
Series: Applied Logic Series 36
Publisher: Springer
Year: 2009

Language: English
Commentary: no cover, no bookmarks, no pagination
Pages: 276
Tags: Mathematical Logic and Foundations; Artificial Intelligence (incl. Robotics); Logic; Order, Lattices, Ordered Algebraic Structures

Front Matter....Pages I-VIII
Introduction....Pages 1-6
The Semantic Basis....Pages 7-35
Hilbert Systems....Pages 37-66
Gentzen Systems....Pages 67-100
Syntactic Eliminations....Pages 101-135
Fundamental Logics....Pages 137-175
Uniformity and Efficiency....Pages 177-199
First-Order Logics....Pages 201-228
Further Topics....Pages 229-258
Back Matter....Pages 259-276