An Introduction to Independence for Analysts
An Introduction to Independence for Analysts
H. G. Dales
W. H. Woodin
W. H. Woodin
No date available
Paperback
9780521339964
Paperback
Forcing is a powerful tool from logic which is used to prove that certain propositions of mathematics are independent of the basic axioms of set theory, ZFC. This book explains clearly, to non-logicians, the technique of forcing and its connection with independence, and gives a full proof that a naturally arising and deep question of analysis is independent of ZFC. It provides an accessible account of this result, and it includes a discussion, of Martin's Axiom and of the independence of CH.
Product details
No date availablePaperback
9780521339964
256 pages
228 × 152 × 26 mm
0.736kg
Table of Contents
- 1. Homomorphisms from algebras of continuous functions
- 2. Partial orders, Boolean algebras, and ultraproducts
- 3. Woodin's condition
- 4. Independence in set theory
- 5. Martin's Axiom
- 6. Gaps in ordered sets
- 7. Forcing
- 8. Iterated Forcing.
