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  1. Home
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  3. Constructibility
  • Cited by 4
Publisher:
Cambridge University Press
Online publication date:
March 2017
Print publication year:
2017
Online ISBN:
9781316717219
DOI:
https://doi.org/10.1017/9781316717219
Subjects:
Mathematics, Logic, Categories and Sets, Computer Science, Programming Languages and Applied Logic
Series:
Perspectives in Logic (6)
Information

Book description

Since their inception, the Perspectives in Logic and Lecture Notes in Logic series have published seminal works by leading logicians. Many of the original books in the series have been unavailable for years, but they are now in print once again. In this volume, the sixth publication in the Perspectives in Logic series, Keith J. Devlin gives a comprehensive account of the theory of constructible sets at an advanced level. The book provides complete coverage of the theory itself, rather than the many and diverse applications of constructibility theory, although applications are used to motivate and illustrate the theory. The book is divided into two parts: Part I (Elementary Theory) deals with the classical definition of the Lα-hierarchy of constructible sets and may be used as the basis of a graduate course on constructibility theory. and Part II (Advanced Theory) deals with the Jα-hierarchy and the Jensen 'fine-structure theory'.

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Contents

Contents
References
Bibliography
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Beller, A., Litman, A. 1980 A Strengthening of Jensen's □ Principles. J. Symbolic Logic 45, 251–264
Chang, C. C., Keisler, H. J. 1973 Model Theory. North Holland
Devlin, K. J. 1973 Aspects of Constructibility. Springer-Verlag: Lecture Notes in Mathematics 354
Devlin, K. J. 1979 Fundamentals of Contemporary Set Theory. Springer-Verlag
Devlin, K. J. 1979a Variations on ◊. J. Symbolic Logic 44, 51–58
Devlin, K. J., Jensen, R. B. 1975 Marginalia to a Theorem of Silver. In “Logic Conference Kiel 1974”. Springer- Verlag: Lecture Notes in Mathematics 499, 115–142
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Velleman, D. 1984 Simplified Morasses. J. Symbolic Logic
Velleman, D. 1984a Simplified Morasses with Linear Limits. J. Symbolic Logic

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