An introduction to bisimulation and coinduction
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Author
Publication
2011 - Cambridge University Press, Cambridge, England
Language
English
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0 words, Guess
Page Count
0 pages
Identifiers
- Internet Archiveintroductiontobi00sang_347
- Internet Archiveintroductiontobi00sang
- ISBN-139781107003637
- ISBN-101107003636
- Library of Congress Control Number2011027492
and 3 more
- Better World Books9781107003637
- Better World BooksKR-754-156
- Open LibraryOL25046123M
Classifications
- DDC004.01/5113
- LCCQA76.9.A96 S366 2011
- LCCQA76.9.A96 S366 2012
Description
"Induction is a pervasive tool in computer science and mathematics for defining objects and reasoning on them. Coinduction is the dual of induction and as such it brings in quite different tools. Today, it is widely used in computer science, but also in other fields, including artificial intelligence, cognitive science, mathematics, modal logics, philosophy and physics. The best known instance of coinduction is bisimulation, mainly employed to define and prove equalities among potentially infinite objects: processes, streams, non-well-founded sets, etc. This book presents bisimulation and coinduction: the fundamental concepts and techniques and the duality with induction. Each chapter contains exercises and selected solutions, enabling students to connect theory with practice. A special emphasis is placed on bisimulation as a behavioural equivalence for processes. Thus the book serves as an introduction to models for expressing processes (such as process calculi) and to the associated techniques of operational and algebraic analysis"-- "Induction is a pervasive tool in computer science and mathematics for defining objects and reasoning on them. Coinduction is the dual of induction, and as such it brings in quite different tools. Today, it is widely used in computer science, but also in other fields, including artificial intelligence, cognitive science, mathematics, modal logics, philosophy and physics. The best known instance of coinduction is bisimulation, mainly employed to define and prove equalities among potentially infinite objects: processes, streams, nonwell- founded sets, etc"--
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