Descriptive Set Theory and Forcing: How to prove theorems about Borel sets the hard way: 4 (Lecture Notes in Logic, 4) - Softcover

Miller, Arnold

 
9783540600596: Descriptive Set Theory and Forcing: How to prove theorems about Borel sets the hard way: 4 (Lecture Notes in Logic, 4)
Softcover
ISBN 10: 3540600590 ISBN 13: 9783540600596
Publisher: Springer, 1995

Synopsis

An advanced graduate course. Some knowledge of forcing is assumed, and some elementary Mathematical Logic, e.g. the Lowenheim-Skolem Theorem. A student with one semester of mathematical logic and 1 of set theory should be prepared to read these notes. The first half deals with the general area of Borel hierarchies. What are the possible lengths of a Borel hierarchy in a separable metric space? Lebesgue showed that in an uncountable complete separable metric space the Borel hierarchy has uncountably many distinct levels, but for incomplete spaces the answer is independent. The second half includes Harrington's Theorem - it is consistent to have sets on the second level of the projective hierarchy of arbitrary size less than the continuum and a proof and appl- ications of Louveau's Theorem on hyperprojective parameters.

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Review

"Miller includes interesting historical material and references. His taste for slick, elegant proofs makes the book pleasant to read. The author makes good use of his sense of humor...Most readers will enjoy the comments, footnotes, and jokes scattered throughout the book." Studia Logica

Book Description

These notes develop the theory of descriptive sets, leading up to a new proof of Louveau's separation theorem for analytic sets. A first course in mathematical logic and set theory is assumed, making this book suitable for advanced students and researchers.

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Publisher
Springer
Publication date
1995
Language
English
ISBN 10 
3540600590
ISBN 13 
9783540600596
Binding
Paperback
Number of pages
137

Other Popular Editions of the Same Title

9781568811765: Descriptive Set Theory and Forcing: Revised Second Printing Lecture Notes in Logic #4

Featured Edition

ISBN 10:  1568811764 ISBN 13:  9781568811765
Publisher: A K Peters/CRC Press, 2001
Softcover