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Axiomatic Set Theory, Part 1
Edited by:
D. S. Scott
Softcover ISBN:  9780821802458 
Product Code:  PSPUM/13.1 
List Price:  $139.00 
MAA Member Price:  $125.10 
AMS Member Price:  $111.20 
eBook ISBN:  9780821892978 
Product Code:  PSPUM/13.1.E 
List Price:  $135.00 
MAA Member Price:  $121.50 
AMS Member Price:  $108.00 
Softcover ISBN:  9780821802458 
eBook: ISBN:  9780821892978 
Product Code:  PSPUM/13.1.B 
List Price:  $274.00 $206.50 
MAA Member Price:  $246.60 $185.85 
AMS Member Price:  $219.20 $165.20 
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Axiomatic Set Theory, Part 1
Edited by:
D. S. Scott
Softcover ISBN:  9780821802458 
Product Code:  PSPUM/13.1 
List Price:  $139.00 
MAA Member Price:  $125.10 
AMS Member Price:  $111.20 
eBook ISBN:  9780821892978 
Product Code:  PSPUM/13.1.E 
List Price:  $135.00 
MAA Member Price:  $121.50 
AMS Member Price:  $108.00 
Softcover ISBN:  9780821802458 
eBook ISBN:  9780821892978 
Product Code:  PSPUM/13.1.B 
List Price:  $274.00 $206.50 
MAA Member Price:  $246.60 $185.85 
AMS Member Price:  $219.20 $165.20 

Book DetailsProceedings of Symposia in Pure MathematicsVolume: 13; 1971; 474 ppMSC: Primary 00This item is also available as part of a set:

Table of Contents

Articles

C. C. Chang — Sets constructible using $L_{\kappa \kappa }$ [ MR 0280357 ]

Paul J. Cohen — Comments on the foundations of set theory [ MR 0277332 ]

P. Erdős and A. Hajnal — Unsolved problems in set theory [ MR 0280381 ]

Harvey Friedman — A more explicit set theory [ MR 0278932 ]

Petr Hájek — Sets, semisets, models [ MR 0277377 ]

J. D. Halpern and A. Lévy — The Boolean prime ideal theorem does not imply the axiom of choice. [ MR 0284328 ]

Thomáš Jech — On models for set theory without AC

Ronald B. Jensen and Carol Karp — Primitive recursive set functions [ MR 0281602 ]

H. Jerome Keisler and Jack H. Silver — End extensions of models of set theory [ MR 0321729 ]

G. Kreisel — Observations on popular discussions of foundations [ MR 0294123 ]

Kenneth Kunen — Indescribability and the continuum [ MR 0282829 ]

Azriel Lévy — The sizes of the indescribable cardinals [ MR 0281606 ]

Azriel Lévy — On the logical complexity of several axioms of set theory [ MR 0299471 ]

Saunders Mac Lane — Categorical algebra and settheoretic foundations [ MR 0282791 ]

R. Mansfield — The solution of one of Ulam’s problems concerning analytic rectangles

Yiannis N. Moschovakis — Predicative classes [ MR 0281599 ]

Jan Mycielski — On some consequences of the axiom of determinateness [ MR 0277378 ]

John Myhill — Embedding classical type theory in “intuitionistic” type theory [ MR 0281583 ]

John Myhill and Dana Scott — Ordinal definability [ MR 0281603 ]

Kanji Namba — An axiom of strong infinity and analytic hierarchy of ordinal numbers. [ MR 0281607 ]

Lawrence Pozsgay — Liberal intuitionism as a basis for set theory [ MR 0288021 ]

Gerald E. Sacks — Forcing with perfect closed sets [ MR 0276079 ]

J. R. Shoenfield — Unramified forcing [ MR 0280359 ]

Jack Silver — The independence of Kurepa’s conjecture and twocardinal conjectures in model theory [ MR 0277379 ]

Jack Silver — The consistency of the GCH with the existence of a measurable cardinal [ MR 0278937 ]

Robert M. Solovay — Realvalued measurable cardinals [ MR 0290961 ]

G. L. Sward — Transfinite sequences of axiom systems for set theory [ MR 0289288 ]

Gaisi Takeuti — Hypotheses on power set [ MR 0300901 ]

Martin M. Zuckerman — Multiple choice axioms [ MR 0280360 ]


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Volume: 13; 1971; 474 pp
MSC: Primary 00
This item is also available as part of a set:

Articles

C. C. Chang — Sets constructible using $L_{\kappa \kappa }$ [ MR 0280357 ]

Paul J. Cohen — Comments on the foundations of set theory [ MR 0277332 ]

P. Erdős and A. Hajnal — Unsolved problems in set theory [ MR 0280381 ]

Harvey Friedman — A more explicit set theory [ MR 0278932 ]

Petr Hájek — Sets, semisets, models [ MR 0277377 ]

J. D. Halpern and A. Lévy — The Boolean prime ideal theorem does not imply the axiom of choice. [ MR 0284328 ]

Thomáš Jech — On models for set theory without AC

Ronald B. Jensen and Carol Karp — Primitive recursive set functions [ MR 0281602 ]

H. Jerome Keisler and Jack H. Silver — End extensions of models of set theory [ MR 0321729 ]

G. Kreisel — Observations on popular discussions of foundations [ MR 0294123 ]

Kenneth Kunen — Indescribability and the continuum [ MR 0282829 ]

Azriel Lévy — The sizes of the indescribable cardinals [ MR 0281606 ]

Azriel Lévy — On the logical complexity of several axioms of set theory [ MR 0299471 ]

Saunders Mac Lane — Categorical algebra and settheoretic foundations [ MR 0282791 ]

R. Mansfield — The solution of one of Ulam’s problems concerning analytic rectangles

Yiannis N. Moschovakis — Predicative classes [ MR 0281599 ]

Jan Mycielski — On some consequences of the axiom of determinateness [ MR 0277378 ]

John Myhill — Embedding classical type theory in “intuitionistic” type theory [ MR 0281583 ]

John Myhill and Dana Scott — Ordinal definability [ MR 0281603 ]

Kanji Namba — An axiom of strong infinity and analytic hierarchy of ordinal numbers. [ MR 0281607 ]

Lawrence Pozsgay — Liberal intuitionism as a basis for set theory [ MR 0288021 ]

Gerald E. Sacks — Forcing with perfect closed sets [ MR 0276079 ]

J. R. Shoenfield — Unramified forcing [ MR 0280359 ]

Jack Silver — The independence of Kurepa’s conjecture and twocardinal conjectures in model theory [ MR 0277379 ]

Jack Silver — The consistency of the GCH with the existence of a measurable cardinal [ MR 0278937 ]

Robert M. Solovay — Realvalued measurable cardinals [ MR 0290961 ]

G. L. Sward — Transfinite sequences of axiom systems for set theory [ MR 0289288 ]

Gaisi Takeuti — Hypotheses on power set [ MR 0300901 ]

Martin M. Zuckerman — Multiple choice axioms [ MR 0280360 ]
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