product iamge

Set Theory and the Continuum Problem

This document was uploaded by one of our users. The uploader already confirmed that they had the permission to publish it. If you are author/publisher or own the copyright of this documents, please report to us by using this DMCA report form.

Download
Search on Amazon

Simply click on the Download Book button.

Yes, Book downloads on Ebookily are 100% Free.

Sometimes the book is free on Amazon As well, so go ahead and hit "Search on Amazon"

Set Theory and the Continuum Problem is a novel introduction to set theory, including axiomatic development, consistency, and independence results. It is self-contained and covers all the set theory that a mathematician should know. Part I introduces set theory, including basic axioms, development of the natural number system, Zorn's Lemma and other maximal principles. Part II proves the consistency of the continuum hypothesis and the axiom of choice, with material on collapsing mappings, model-theoretic results, and constructible sets. Part III presents a version of Cohen's proofs of the independence of the continuum hypothesis and the axiom of choice. It also presents, for the first time in a textbook, the double induction and superinduction principles, and Cowen's theorem. The book will interest students and researchers in logic and set theory.

Author(s): Raymond M. Smullyan, Melvin Fitting
Series: Oxford Logic Guides 34
Publisher: Oxford University Press
Year: 1996

Language: English
Commentary: pp. 212-213 are repeated twice, last page is split
Pages: 305

Preface......Page 5
Contents......Page 9
Part I......Page 15
01 General Background......Page 17
02 Some Basics of Class-Set Theory......Page 28
03 The Natural Numbers......Page 41
04 Superinduction, Well Ordering and Choice......Page 57
05 Ordinal Numbers......Page 78
06 Order Isomorphism and Transfinite Recursion......Page 84
07 Rank......Page 95
08 Foundation, $\in$-Induction, and Rank......Page 102
09 Cardinals......Page 110
Part II - Consistency of the continuum hypothesis......Page 127
10 Mostowski-Shepherdson Mappings......Page 129
11 Reflection Principles......Page 142
12 Constructible Sets......Page 155
13 L is a Well Founded First-Order Universe......Page 167
14 Constructibility is Absolute Over L......Page 176
15 Constructibility and the Continuum Hypothesis......Page 190
Part III - Forcing and independence results......Page 201
16 Forcing, The Very Idea......Page 203
17 The Construction of S4 Models for ZF......Page 217
18 The Axiom of Constructibility is Independent......Page 242
19 Independence of the Continuum Hypothesis......Page 251
20 Independence of the Axiom of Choice......Page 259
21 Constructing Classical Models......Page 275
22 Forcing Background......Page 287
References......Page 293
Subject Index......Page 297
Notation Index......Page 303