Set theory / Thomas Jech.
Tipo de material: TextoIdioma: eng. Series Springer monographs in mathematicsDetalles de publicación: Berlin : Springer ; 2003.Edición: 3rd edDescripción: xiii, 769 p. ; 24 cmISBN:- 3540440852
- 9783540440857
- 14397382
- 511.322 21
Tipo de ítem | Biblioteca actual | Signatura | Copia número | Estado | Fecha de vencimiento | Código de barras | Reserva de ítems | |
---|---|---|---|---|---|---|---|---|
Colección general | Biblioteca Yachay Tech | 511.322 J44s 2003 (Navegar estantería(Abre debajo)) | Ej. 1 | Disponible | 004311 |
Includes indexes.
Includes bibliographical references (p. 707-732).
Part I. Basic Set Theory.
- Axioms of Set Theory.
- Ordinal Numbers.
- Cardinal Numbers.
- Real Numbers.
- The Axiom of Choice and Cardinal Arithmetic.
- The Axiom of Regularity.
- Filters, Ultrafilters and Boolean Algebras.
- Stationary Sets.
- Combinatorial Set Theory.
- Measurable Cardinals.
- Borel and Analytic Sets.
- Models of Set Theory. Part II. Advanced Set Theory.
- Constructible Sets.
- Forcing.
- Applications of Forcing.
- Iterated Forcing and Martin's Axiom.
- Large Cardinals.
- Large Cardinals and L.
- Iterated Ultrapowers and LÄUÜ.
- Very Large Cardinals.
- Large Cardinals and Forcing.
- Saturated Ideals.
- The Nonstationary Ideal.
- The Singular Cardinal Problem.
- Descriptive Set Theory.
- The Real Line. Part III. Selected Topics.
- Combinatorial Principles in L.
- More Applications of Forcing.
- More Combinatorial Set Theory.
- Complete Boolean Algebras.
- Proper Forcing.
- More Descriptive Set Theory.
- Determinacy.
- Supercompact Cardinals and the Real Line.
- Inner Models for Large Cadinals.
- Forcing and Large Cardinals.
- Martin's Maximum.
- More on Stationary Sets.
- Bibliography.
- Notation.
- Index.
- Name Index.
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