Format:
Online Ressource (xii, 351 pages)
Edition:
Online-Ausg. [S.l.] HathiTrust Digital Library Online-Ausg. [S.l.] : HathiTrust Digital Library
ISBN:
9780080954868
,
0080954863
,
9780444105356
Series Statement:
Studies in logic and the foundations of mathematics v. 76
Content:
1. pai nm and Sigma nm-indescribables2. Enforceable classes; 3. Indescribability of measurable cardinals; 4. v-indescribable cardinals; Notes to Chapter 9; Chapter 10. Infinitarylanguages and Large Cardinals; 1. The languages Laß; 2. Weakly compact cardinals; 3. Strongly compact cardinals; 4. Summary of large cardinals; Notes to Chapter 10; Bibliography; Index; List of Symbols and Abbreviations Used and Page Where Introduced
Content:
7. The generalized continuum hypothesis inaccessible cardinals; 8. Ramsey's theorem; Notes to Chapter 2; Chapter 3. The Lévy Hierarchy And The Reflection Principle; 1. Transitive €-structures; 2. Lévy's hierarchy; 3. Delta and transfinite induction; 4. Absoluteness; 5. Delta-definability of the satisfaction relation; 6. The reflection principle of ZF; 7. Cardinality and Sigma-formulas; Notes to Chapter 3; Chapter 4. Inaccessible and Mahlocardinals; 1. Properties of Va; 2. Normal functions; 3. Mahlo cardinals; 4. Reflection principles for Mahlo cardinals; Notes to Chapter 4
Content:
Chapter 5. The Constructible Universe1. Constructible sets; 2. Gödel's theorems on L: AC and GCH; 3. Constructible orders; 4. On reducing proofs to ZFC; 5. The minimal model of ZF; 6. Relative constructibility; 7. The analytical hierarchy and constructible sets; 8. Ordinal definable sets; Notes to Chapter 5; Chapter 6. Measurable Cardinals; 1. Measures: classical properties; 2. The ultrapower construction for measurable cardinals; 3. Normal measures; 4. Measurable cardinals and constructible sets; 5. Measurable cardinals and the GCH; Notes to Chapter 6
Content:
Front Cover; Set Theory: An Introduction to Large Cardinals; Copyright Page; Contents; Preface; Chapter 1. Introduction: Sets and Languages; 1. What are sets?-The cumulative type structure; 2. The first-order language of set theory; 3. The Zermelo-Fraenkel axioms; 4. A note on paradoxes; 5. More general languages; 6. The hereditarily finite sets-an example; Notes to Chapter 1; Chapter 2. Thedevelopment of ZFC; 1. Elementary definitions; 2. Ordinals; 3. Transfinite induction; 4. Cardinals: introduction; 5. Cardinal arithmetic; 6. The axiom of choice
Content:
Provability, Computability and Reflection
Note:
Includes bibliographical references and index. - Print version record
,
Print version record
,
Master and use copy. Digital master created according to Benchmark for Faithful Digital Reproductions of Monographs and Serials, Version 1. Digital Library Federation, December 2002
,
Online-Ausg. [S.l.] : HathiTrust Digital Library
,
Master and use copy. Digital master created according to Benchmark for Faithful Digital Reproductions of Monographs and Serials, Version 1. Digital Library Federation, December 2002.
,
English
Additional Edition:
ISBN 0444105352
Additional Edition:
ISBN 0720422000
Additional Edition:
ISBN 0720422795
Additional Edition:
Erscheint auch als Druck-Ausgabe Drake, F. R. (Frank Robert) Set theory Amsterdam : North-Holland Pub. Co. ; New York : American Elsevier Pub. Co, 1974
Language:
English
Subjects:
Mathematics
Keywords:
Kardinalzahl
;
Electronic books
;
Electronic books
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