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Set Theory With an Introduction to Real Point Sets /

What is a number? What is infinity? What is continuity? What is order? Answers to these fundamental questions obtained by late nineteenth-century mathematicians such as Dedekind and Cantor gave birth to set theory. This textbook presents classical set theory in an intuitive but concrete manner. To a...

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Detalles Bibliográficos
Clasificación:Libro Electrónico
Autor principal: Dasgupta, Abhijit (Autor)
Autor Corporativo: SpringerLink (Online service)
Formato: Electrónico eBook
Idioma:Inglés
Publicado: New York, NY : Springer New York : Imprint: Birkhäuser, 2014.
Edición:1st ed. 2014.
Temas:
Acceso en línea:Texto Completo
Tabla de Contenidos:
  • 1 Preliminaries: Sets, Relations, and Functions
  • Part I Dedekind: Numbers
  • 2 The Dedekind-Peano Axioms
  • 3 Dedekind's Theory of the Continuum
  • 4 Postscript I: What Exactly Are the Natural Numbers?
  • Part II Cantor: Cardinals, Order, and Ordinals
  • 5 Cardinals: Finite, Countable, and Uncountable
  • 6 Cardinal Arithmetic and the Cantor Set
  • 7 Orders and Order Types
  • 8 Dense and Complete Orders
  • 9 Well-Orders and Ordinals
  • 10 Alephs, Cofinality, and the Axiom of Choice
  • 11 Posets, Zorn's Lemma, Ranks, and Trees
  • 12 Postscript II: Infinitary Combinatorics
  • Part III Real Point Sets
  • 13 Interval Trees and Generalized Cantor Sets
  • 14 Real Sets and Functions
  • 15 The Heine-Borel and Baire Category Theorems
  • 16 Cantor-Bendixson Analysis of Countable Closed Sets
  • 17 Brouwer's Theorem and Sierpinski's Theorem
  • 18 Borel and Analytic Sets
  • 19 Postscript III: Measurability and Projective Sets
  • Part IV Paradoxes and Axioms
  • 20 Paradoxes and Resolutions
  • 21 Zermelo-Fraenkel System and von Neumann Ordinals
  • 22 Postscript IV: Landmarks of Modern Set Theory
  • Appendices
  • A Proofs of Uncountability of the Reals
  • B Existence of Lebesgue Measure
  • C List of ZF Axioms
  • References
  • List of Symbols and Notations
  • Index.