Softcover ISBN: | 978-1-4704-6961-0 |
Product Code: | GSM/220.S |
List Price: | $85.00 |
MAA Member Price: | $76.50 |
AMS Member Price: | $68.00 |
eBook ISBN: | 978-1-4704-6960-3 |
EPUB ISBN: | 978-1-4704-7235-1 |
Product Code: | GSM/220.E |
List Price: | $85.00 |
MAA Member Price: | $76.50 |
AMS Member Price: | $68.00 |
Softcover ISBN: | 978-1-4704-6961-0 |
eBook: ISBN: | 978-1-4704-6960-3 |
Product Code: | GSM/220.S.B |
List Price: | $170.00 $127.50 |
MAA Member Price: | $153.00 $114.75 |
AMS Member Price: | $136.00 $102.00 |
Softcover ISBN: | 978-1-4704-6961-0 |
Product Code: | GSM/220.S |
List Price: | $85.00 |
MAA Member Price: | $76.50 |
AMS Member Price: | $68.00 |
eBook ISBN: | 978-1-4704-6960-3 |
EPUB ISBN: | 978-1-4704-7235-1 |
Product Code: | GSM/220.E |
List Price: | $85.00 |
MAA Member Price: | $76.50 |
AMS Member Price: | $68.00 |
Softcover ISBN: | 978-1-4704-6961-0 |
eBook ISBN: | 978-1-4704-6960-3 |
Product Code: | GSM/220.S.B |
List Price: | $170.00 $127.50 |
MAA Member Price: | $153.00 $114.75 |
AMS Member Price: | $136.00 $102.00 |
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Book DetailsGraduate Studies in MathematicsVolume: 220; 2022; 399 ppMSC: Primary 03; 54
Ultrafilters and ultraproducts provide a useful generalization of the ordinary limit processes which have applications to many areas of mathematics. Typically, this topic is presented to students in specialized courses such as logic, functional analysis, or geometric group theory. In this book, the basic facts about ultrafilters and ultraproducts are presented to readers with no prior knowledge of the subject and then these techniques are applied to a wide variety of topics. The first part of the book deals solely with ultrafilters and presents applications to voting theory, combinatorics, and topology, while also dealing also with foundational issues. The second part presents the classical ultraproduct construction and provides applications to algebra, number theory, and nonstandard analysis. The third part discusses a metric generalization of the ultraproduct construction and gives example applications to geometric group theory and functional analysis. The final section returns to more advanced topics of a more foundational nature.
The book should be of interest to undergraduates, graduate students, and researchers from all areas of mathematics interested in learning how ultrafilters and ultraproducts can be applied to their specialty.
ReadershipUndergraduate and graduate students and researchers interested in ultrafilters and ultraproducts in geometric group theory, combinatorics, and number theory.
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Table of Contents
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Ultrafilters and their applications
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Ultrafilter basics
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Arrow’s theorem on fair voting
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Ultrafilters in topology
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Ramsey theory and combinatorial number theory
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Foundational concerns
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Classical ultraproducts
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Classical ultraproducts
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Applicationis to geometry, commutative algebra, and number theory
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Ultraproducts and saturation
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Nonstandard analysis
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Limit groups
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Metric ultraproducts and their applications
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Metric ultraproducts
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Asymptotic cones and Gromov’s theorem
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Sofic groups
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Functional analysis
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Advanced topics
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Does an ultrapower depend on the ultrafilter?
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The Keisler-Shelah theorem
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Large cardinals
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Appendices
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Logic
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Set theory
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Category theory
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Hints and solutions to selected exercises
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Additional Material
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Reviews
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This is a good book to have, both as a reference and as a source of material for projects, for students who like a challenge.
Klaas Pieter Hart (Delft University of Technology), MathSciNet
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RequestsReview Copy – for publishers of book reviewsDesk Copy – for instructors who have adopted an AMS textbook for a courseExamination Copy – for faculty considering an AMS textbook for a coursePermission – for use of book, eBook, or Journal contentAccessibility – to request an alternate format of an AMS title
- Book Details
- Table of Contents
- Additional Material
- Reviews
- Requests
Ultrafilters and ultraproducts provide a useful generalization of the ordinary limit processes which have applications to many areas of mathematics. Typically, this topic is presented to students in specialized courses such as logic, functional analysis, or geometric group theory. In this book, the basic facts about ultrafilters and ultraproducts are presented to readers with no prior knowledge of the subject and then these techniques are applied to a wide variety of topics. The first part of the book deals solely with ultrafilters and presents applications to voting theory, combinatorics, and topology, while also dealing also with foundational issues. The second part presents the classical ultraproduct construction and provides applications to algebra, number theory, and nonstandard analysis. The third part discusses a metric generalization of the ultraproduct construction and gives example applications to geometric group theory and functional analysis. The final section returns to more advanced topics of a more foundational nature.
The book should be of interest to undergraduates, graduate students, and researchers from all areas of mathematics interested in learning how ultrafilters and ultraproducts can be applied to their specialty.
Undergraduate and graduate students and researchers interested in ultrafilters and ultraproducts in geometric group theory, combinatorics, and number theory.
-
Ultrafilters and their applications
-
Ultrafilter basics
-
Arrow’s theorem on fair voting
-
Ultrafilters in topology
-
Ramsey theory and combinatorial number theory
-
Foundational concerns
-
Classical ultraproducts
-
Classical ultraproducts
-
Applicationis to geometry, commutative algebra, and number theory
-
Ultraproducts and saturation
-
Nonstandard analysis
-
Limit groups
-
Metric ultraproducts and their applications
-
Metric ultraproducts
-
Asymptotic cones and Gromov’s theorem
-
Sofic groups
-
Functional analysis
-
Advanced topics
-
Does an ultrapower depend on the ultrafilter?
-
The Keisler-Shelah theorem
-
Large cardinals
-
Appendices
-
Logic
-
Set theory
-
Category theory
-
Hints and solutions to selected exercises
-
This is a good book to have, both as a reference and as a source of material for projects, for students who like a challenge.
Klaas Pieter Hart (Delft University of Technology), MathSciNet