Overview
- Aims at filling the gap between existing introductory and advanced textbooks
- Introduces to the most important modal logics with multiple modalities from the perspective of the associated reasoning tasks
- Concentrates on the most general and powerful reasoning method for modal logics: tableaux systems
- Includes supplementary material: sn.pub/extras
Part of the book series: Studies in Universal Logic (SUL)
Access this book
Tax calculation will be finalised at checkout
Other ways to access
Table of contents (7 chapters)
Keywords
About this book
Possible worlds models were introduced by Saul Kripke in the early 1960s. Basically, a possible world's model is nothing but a graph with labelled nodes and labelled edges. Such graphs provide semantics for various modal logics (alethic, temporal, epistemic and doxastic, dynamic, deontic, description logics) and also turned out useful for other nonclassical logics (intuitionistic, conditional, several paraconsistent and relevant logics). All these logics have been studied intensively in philosophical and mathematical logic and in computer science, and have been applied increasingly in domains such as program semantics, artificial intelligence, and more recently in the semantic web. Additionally, all these logics were also studied proof theoretically. The proof systems for modal logics come in various styles: Hilbert style, natural deduction, sequents, and resolution. However, it is fair to say that the most uniform and most successful such systems are tableaux systems. Given logic and a formula, they allow one to check whether there is a model in that logic. This basically amounts to trying to build a model for the formula by building a tree.
This book follows a more general approach by trying to build a graph, the advantage being that a graph is closer to a Kripke model than a tree. It provides a step-by-step introduction to possible worlds semantics (and by that to modal and other nonclassical logics) via the tableaux method. It is accompanied by a piece of software called LoTREC (www.irit.fr/Lotrec). LoTREC allows to check whether a given formula is true at a given world of a given model and to check whether a given formula is satisfiable in a given logic. The latter can be done immediately if the tableau system for that logic has already been implemented in LoTREC. If this is not yet the case LoTREC offers the possibility to implement a tableau system in a relatively easy way via a simple, graph-based, interactive language.
Reviews
From the reviews:
“This is an excellent book to use –– either as a stand-alone text or with another textbook –– for an introductory undergraduate course in logic addressed to majors in the humanities, social sciences, computer science, or mathematics. … A basic unifying theme of the book is to construct models of possible worlds and to check formula satisfiability using graph-theoretic tableaux systems.” (Russell Jay Hendel, MAA Reviews, February, 2014)
“This book provides an accessible introduction to modal logics indeed. … The book is well written and quite informative … . It can be used as an easy-going introduction for all who are interested in automated reasoning and need some formal tools for playing with modal logics.” (Andrzej Indrzejczak, zbMATH, Vol. 1280, 2014)
Authors and Affiliations
Bibliographic Information
Book Title: Kripke’s Worlds
Book Subtitle: An Introduction to Modal Logics via Tableaux
Authors: Olivier Gasquet, Andreas Herzig, Bilal Said, François Schwarzentruber
Series Title: Studies in Universal Logic
DOI: https://doi.org/10.1007/978-3-7643-8504-0
Publisher: Birkhäuser Basel
eBook Packages: Mathematics and Statistics, Mathematics and Statistics (R0)
Copyright Information: Springer Basel AG 2014
Softcover ISBN: 978-3-7643-8503-3Published: 09 December 2013
eBook ISBN: 978-3-7643-8504-0Published: 20 November 2013
Series ISSN: 2297-0282
Series E-ISSN: 2297-0290
Edition Number: 1
Number of Pages: XV, 198
Number of Illustrations: 73 b/w illustrations
Topics: Mathematical Logic and Foundations, Mathematics, general