Hardcover ISBN: | 978-0-8218-4991-0 |
Product Code: | SURV/206 |
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eBook ISBN: | 978-1-4704-2677-4 |
Product Code: | SURV/206.E |
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AMS Member Price: | $100.00 |
Hardcover ISBN: | 978-0-8218-4991-0 |
eBook: ISBN: | 978-1-4704-2677-4 |
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MAA Member Price: | $228.60 $172.35 |
AMS Member Price: | $203.20 $153.20 |
Hardcover ISBN: | 978-0-8218-4991-0 |
Product Code: | SURV/206 |
List Price: | $129.00 |
MAA Member Price: | $116.10 |
AMS Member Price: | $103.20 |
eBook ISBN: | 978-1-4704-2677-4 |
Product Code: | SURV/206.E |
List Price: | $125.00 |
MAA Member Price: | $112.50 |
AMS Member Price: | $100.00 |
Hardcover ISBN: | 978-0-8218-4991-0 |
eBook ISBN: | 978-1-4704-2677-4 |
Product Code: | SURV/206.B |
List Price: | $254.00 $191.50 |
MAA Member Price: | $228.60 $172.35 |
AMS Member Price: | $203.20 $153.20 |
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Book DetailsMathematical Surveys and MonographsVolume: 206; 2015; 374 ppMSC: Primary 53; 58; 35; 57
Ricci flow is a powerful technique using a heat-type equation to deform Riemannian metrics on manifolds to better metrics in the search for geometric decompositions. With the fourth part of their volume on techniques and applications of the theory, the authors discuss long-time solutions of the Ricci flow and related topics.
In dimension 3, Perelman completed Hamilton's program to prove Thurston's geometrization conjecture. In higher dimensions the Ricci flow has remarkable properties, which indicates its usefulness to understand relations between the geometry and topology of manifolds. This book discusses recent developments on gradient Ricci solitons, which model the singularities developing under the Ricci flow. In the shrinking case there is a surprising rigidity which suggests the likelihood of a well-developed structure theory. A broader class of solutions is ancient solutions; the authors discuss the beautiful classification in dimension 2. In higher dimensions they consider both ancient and singular Type I solutions, which must have shrinking gradient Ricci soliton models. Next, Hamilton's theory of 3-dimensional nonsingular solutions is presented, following his original work. Historically, this theory initially connected the Ricci flow to the geometrization conjecture. From a dynamical point of view, one is interested in the stability of the Ricci flow. The authors discuss what is known about this basic problem. Finally, they consider the degenerate neckpinch singularity from both the numerical and theoretical perspectives.
This book makes advanced material accessible to researchers and graduate students who are interested in the Ricci flow and geometric evolution equations and who have a knowledge of the fundamentals of the Ricci flow.
ReadershipGraduate students and researchers interested in geometric evolution equations.
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Table of Contents
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Chapters
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Chapter 27. Noncompact gradient Ricci solitons
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Chapter 28. Special ancient solutions
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Chapter 29. Compact 2-dimensional ancient solutions
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Chapter 30. Type I singularities and ancient solutions
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Chapter 31. Hyperbolic geometry and 3-manifolds
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Chapter 32. Nonsingular solutions on closed 3-manifolds
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Chapter 33. Noncompact hyperbolic limits
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Chapter 34. Constant mean curvature surfaces and harmonic maps by IFT
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Chapter 35. Stability of Ricci flow
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Chapter 36. Type II singularities and degenerate neckpinches
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Appendix K. Implicit function theorem
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Additional Material
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Reviews
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This book concludes a long series of carefully written and extremely detailed textbooks on the Ricci flow, which have instantly become mandatory reading for any graduate student who is interested in doing research in this field. They are also an excellent resource for established researchers in this and neighboring fields.
Valentino Tosatti, Zentralblatt MATH
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RequestsReview Copy – for publishers of book reviewsPermission – 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
Ricci flow is a powerful technique using a heat-type equation to deform Riemannian metrics on manifolds to better metrics in the search for geometric decompositions. With the fourth part of their volume on techniques and applications of the theory, the authors discuss long-time solutions of the Ricci flow and related topics.
In dimension 3, Perelman completed Hamilton's program to prove Thurston's geometrization conjecture. In higher dimensions the Ricci flow has remarkable properties, which indicates its usefulness to understand relations between the geometry and topology of manifolds. This book discusses recent developments on gradient Ricci solitons, which model the singularities developing under the Ricci flow. In the shrinking case there is a surprising rigidity which suggests the likelihood of a well-developed structure theory. A broader class of solutions is ancient solutions; the authors discuss the beautiful classification in dimension 2. In higher dimensions they consider both ancient and singular Type I solutions, which must have shrinking gradient Ricci soliton models. Next, Hamilton's theory of 3-dimensional nonsingular solutions is presented, following his original work. Historically, this theory initially connected the Ricci flow to the geometrization conjecture. From a dynamical point of view, one is interested in the stability of the Ricci flow. The authors discuss what is known about this basic problem. Finally, they consider the degenerate neckpinch singularity from both the numerical and theoretical perspectives.
This book makes advanced material accessible to researchers and graduate students who are interested in the Ricci flow and geometric evolution equations and who have a knowledge of the fundamentals of the Ricci flow.
Graduate students and researchers interested in geometric evolution equations.
-
Chapters
-
Chapter 27. Noncompact gradient Ricci solitons
-
Chapter 28. Special ancient solutions
-
Chapter 29. Compact 2-dimensional ancient solutions
-
Chapter 30. Type I singularities and ancient solutions
-
Chapter 31. Hyperbolic geometry and 3-manifolds
-
Chapter 32. Nonsingular solutions on closed 3-manifolds
-
Chapter 33. Noncompact hyperbolic limits
-
Chapter 34. Constant mean curvature surfaces and harmonic maps by IFT
-
Chapter 35. Stability of Ricci flow
-
Chapter 36. Type II singularities and degenerate neckpinches
-
Appendix K. Implicit function theorem
-
This book concludes a long series of carefully written and extremely detailed textbooks on the Ricci flow, which have instantly become mandatory reading for any graduate student who is interested in doing research in this field. They are also an excellent resource for established researchers in this and neighboring fields.
Valentino Tosatti, Zentralblatt MATH