Overview

Type theory is a fast-evolving field at the crossroads of logic, computer science and mathematics. This gentle step-by-step introduction is ideal for graduate students and researchers who need to understand the ins and outs of the mathematical machinery, the role of logical rules therein, the essential contribution of definitions and the decisive nature of well-structured proofs. The authors begin with untyped lambda calculus and proceed to several fundamental type systems, including the well-known and powerful Calculus of Constructions. The book also covers the essence of proof checking and proof development, and the use of dependent type theory to formalise mathematics. The only prerequisite is a basic knowledge of undergraduate mathematics. Carefully chosen examples illustrate the theory throughout. Each chapter ends with a summary of the content, some historical context, suggestions for further reading and a selection of exercises to help readers familiarise themselves with the material.

Full Product Details

Author:   Rob Nederpelt (Technische Universiteit Eindhoven, The Netherlands) ,  Herman Geuvers (Radboud Universiteit Nijmegen)
Publisher:   Cambridge University Press
Imprint:   Cambridge University Press
Dimensions:   Width: 17.30cm , Height: 2.80cm , Length: 25.40cm
Weight:   0.980kg
ISBN:  

9781107036505

ISBN 10:   110703650
Pages:   466
Publication Date:   06 November 2014
Audience:   Professional and scholarly ,  Professional and scholarly ,  Professional & Vocational ,  Professional & Vocational
Format:   Hardback
Publisher's Status:   Active
Availability:   Manufactured on demand  
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Table of Contents

Foreword; Preface; Acknowledgements; Greek alphabet; 1. Untyped lambda calculus; 2. Simply typed lambda calculus; 3. Second order typed lambda calculus; 4. Types dependent on types; 5. Types dependent on terms; 6. The Calculus of Constructions; 7. The encoding of logical notions in λC; 8. Definitions; 9. Extension of λC with definitions; 10. Rules and properties of λD; 11. Flag-style natural deduction in λD; 12. Mathematics in λD: a first attempt; 13. Sets and subsets; 14. Numbers and arithmetic in λD; 15. An elaborated example; 16. Further perspectives; Appendix A. Logic in λD; Appendix B. Arithmetical axioms, definitions and lemmas; Appendix C. Two complete example proofs in λD; Appendix D. Derivation rules for λD; References; Index of names; Index of technical notions; Index of defined constants; Index of subjects.

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Author Information

Rob Nederpelt was Lecturer in Logic for Computer Science until his retirement. Currently he is a guest researcher in the Faculty of Mathematics and Computer Science at Eindhoven University of Technology, The Netherlands. Herman Geuvers is Professor in Theoretical Informatics at the Radboud University Nijmegen, and Professor in Proving with Computer Assistance at Eindhoven University of Technology, both in The Netherlands.

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