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London Mathematical Society Lecture Note Ser.: Coding the Universe by P. Welch, A. Beller and R. Jensen (1982, Trade Paperback)

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Coding the Universe, Paperback by Jensen, R., ISBN 0521280400, ISBN-13 9780521280402, Brand New, Free shipping in the US Axiomatic set theory is the concern of this book. More particularly, the authors prove results about the coding of models M, of Zermelo-Fraenkel set theory together with the Generalized Continuum Hypothesis by using a class 'forcing' construction. By this method they extend M to another model L[a] with the same properties.

About this product

Product Identifiers

PublisherCambridge University Press

ISBN-100521280400

ISBN-139780521280402

eBay Product ID (ePID)99474102

Product Key Features

Number of Pages360 Pages

Publication NameCoding the Universe

LanguageEnglish

SubjectHistory & Philosophy, Logic

Publication Year1982

TypeTextbook

Subject AreaMathematics

AuthorP. Welch, A. Beller, R. Jensen

SeriesLondon Mathematical Society Lecture Note Ser.

FormatTrade Paperback

Dimensions

Item Height0.8 in

Item Weight18.8 Oz

Item Length9 in

Item Width6 in

Additional Product Features

Intended AudienceScholarly & Professional

LCCN81-002663

Dewey Edition19

Series Volume NumberSeries Number 47

IllustratedYes

Dewey Decimal511.3/22

Table Of ContentAn introduction; 1. The building blocks; 2. The conditions; 3. Distributivity; 4. The denouement; 5. Applications; 6. The fine-structural lemmas; 7. The Cohen-generic sets; 8. How to get rid of "¬0 #"; 9. Some further applications.

SynopsisAxiomatic set theory is the concern of this book. More particularly, the authors prove results about the coding of models M, of Zermelo-Fraenkel set theory together with the Generalized Continuum Hypothesis by using a class 'forcing' construction. By this method they extend M to another model L[a] with the same properties., Axiomatic set theory is the concern of this book. More particularly, the authors prove results about the coding of models M, of Zermelo-Fraenkel set theory together with the Generalized Continuum Hypothesis by using a class 'forcing' construction. By this method they extend M to another model L a] with the same properties. L a] is G dels universe of 'constructible' sets L, together with a set of integers a which code all the cardinality and cofinality structure of M. Some applications are also considered. Graduate students and research workers in set theory and logic will be especially interested by this account., Axiomatic set theory is the concern of this book. More particularly, the authors prove results about the coding of models M, of Zermelo-Fraenkel set theory together with the Generalized Continuum Hypothesis by using a class 'forcing' construction. By this method they extend M to another model L a] with the same properties. L a] is Godels universe of 'constructible' sets L, together with a set of integers a which code all the cardinality and cofinality structure of M. Some applications are also considered. Graduate students and research workers in set theory and logic will be especially interested by this account.", Axiomatic set theory is the concern of this book. More particularly, the authors prove results about the coding of models M, of Zermelo-Fraenkel set theory together with the Generalized Continuum Hypothesis by using a class 'forcing' construction. By this method they extend M to another model L[a] with the same properties. L[a] is Gödels universe of 'constructible' sets L, together with a set of integers a which code all the cardinality and cofinality structure of M. Some applications are also considered. Graduate students and research workers in set theory and logic will be especially interested by this account.

LC Classification NumberQA248