Handbook of Tableau Methods [electronic resource] / edited by M. D'Agostino, Dov M. Gabbay, Reiner Hähnle, J. Posegga.
Erişim Adresi
ISBN
9789401717540
Dil Kodu
İngilizce
Basım Bildirimi
1st ed. 1999.
Yayın Bilgisi
Dordrecht : Springer Netherlands : Imprint: Springer, 1999.
Fiziksel Niteleme
VIII, 670 p. online resource.
İçindekiler Notu
Tableau Methods for Classical Propositional Logic -- First-order Tableau Methods -- Equality and other Theories -- Tableaux for Intuitionistic Logics -- Tableau Methods for Modal and Temporal Logics -- Tableau Methods for Substructural Logics -- Tableaux for Nonmonotonic Logics -- Tableaux for Many-valued Logics -- Implementing Semantic Tableaux -- A Bibliography on Analytic Tableaux Theorem Proving.
Özet, vb.
Recent years have been blessed with an abundance of logical systems, arising from a multitude of applications. A logic can be characterised in many different ways. Traditionally, a logic is presented via the following three components: 1. an intuitive non-formal motivation, perhaps tie it in to some application area 2. a semantical interpretation 3. a proof theoretical formulation. There are several types of proof theoretical methodologies, Hilbert style, Gentzen style, goal directed style, labelled deductive system style, and so on. The tableau methodology, invented in the 1950s by Beth and Hintikka and later per fected by Smullyan and Fitting, is today one of the most popular, since it appears to bring together the proof-theoretical and the semantical approaches to the pre of a logical system and is also very intuitive. In many universities it is sentation the style first taught to students. Recently interest in tableaux has become more widespread and a community crystallised around the subject. An annual tableaux conference is being held and proceedings are published. The present volume is a Handbook a/Tableaux pre senting to the community a wide coverage of tableaux systems for a variety of logics. It is written by active members of the community and brings the reader up to frontline research. It will be of interest to any formal logician from any area.
Konu
Logic.
Mathematical logic.
Computer science __ Mathematics.
Artificial intelligence.
Logic.
Mathematical Logic and Foundations.
Symbolic and Algebraic Manipulation.
Artificial Intelligence.
Mathematical logic.
Computer science __ Mathematics.
Artificial intelligence.
Logic.
Mathematical Logic and Foundations.
Symbolic and Algebraic Manipulation.
Artificial Intelligence.
Diğer Yazarlar
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