Hardcover ISBN:  9780821844175 
Product Code:  CHEL/365.H 
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eBook ISBN:  9781470431211 
Product Code:  CHEL/365.H.E 
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AMS Member Price:  $58.50 
Hardcover ISBN:  9780821844175 
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Product Code:  CHEL/365.H.B 
List Price:  $134.00 $101.50 
MAA Member Price:  $120.60 $91.35 
AMS Member Price:  $120.60 $91.35 
Hardcover ISBN:  9780821844175 
Product Code:  CHEL/365.H 
List Price:  $69.00 
MAA Member Price:  $62.10 
AMS Member Price:  $62.10 
eBook ISBN:  9781470431211 
Product Code:  CHEL/365.H.E 
List Price:  $65.00 
MAA Member Price:  $58.50 
AMS Member Price:  $58.50 
Hardcover ISBN:  9780821844175 
eBook ISBN:  9781470431211 
Product Code:  CHEL/365.H.B 
List Price:  $134.00 $101.50 
MAA Member Price:  $120.60 $91.35 
AMS Member Price:  $120.60 $91.35 

Book DetailsAMS Chelsea PublishingVolume: 365; 1975; 161 ppMSC: Primary 53; Secondary 58
The central theme of this book is the interaction between the curvature of a complete Riemannian manifold and its topology and global geometry.
The first five chapters are preparatory in nature. They begin with a very concise introduction to Riemannian geometry, followed by an exposition of Toponogov's theorem—the first such treatment in a book in English. Next comes a detailed presentation of homogeneous spaces in which the main goal is to find formulas for their curvature. A quick chapter of Morse theory is followed by one on the injectivity radius.
Chapters 6–9 deal with many of the most relevant contributions to the subject in the years 1959 to 1974. These include the pinching (or sphere) theorem, Berger's theorem for symmetric spaces, the differentiable sphere theorem, the structure of complete manifolds of nonnegative curvature, and finally, results about the structure of complete manifolds of nonpositive curvature. Emphasis is given to the phenomenon of rigidity, namely, the fact that although the conclusions which hold under the assumption of some strict inequality on curvature can fail when the strict inequality on curvature can fail when the strict inequality is relaxed to a weak one, the failure can happen only in a restricted way, which can usually be classified up to isometry.
Much of the material, particularly the last four chapters, was essentially stateoftheart when the book first appeared in 1975. Since then, the subject has exploded, but the material covered in the book still represents an essential prerequisite for anyone who wants to work in the field.
ReadershipGraduate students and research mathematicians interested in Riemannian manifolds.

Table of Contents

Chapters

Chapter 1. Basic concepts and results

Chapter 2. Toponogov’s theorem

Chapter 3. Homogeneous spaces

Chapter 4. Morse theory

Chapter 5. Closed geodesics and the cut locus

Chapter 6. The sphere theorem and its generalizations

Chapter 7. The differentiable sphere theorem

Chapter 8. Complete manifolds of nonnegative curvature

Chapter 9. Compact manifolds of nonpositive curvature


Additional Material

Reviews

... this is a wonderful book, full of fundamental techniques and ideas.
Robert L. Bryant, Director of the Mathematical Sciences Research Institute 
Cheeger and Ebin's book is a truly important classic monograph in Riemannian geometry, with great continuing relevance.
Rafe Mazzeo, Stanford University 
Much of the material, particularly the last four chapters, was essentially stateoftheart when the book first appeared in 1975. Since then, the subject has exploded, but the material covered in the book still represents an essential prerequisite for anyone who wants to work in the field. To conclude, one can say that this book presents many interesting and recent results of global Riemannian geometry, and that by its well composed introductory chapters, the authors have managed to make it readable by nonspecialists.
Zentralblatt MATH


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The central theme of this book is the interaction between the curvature of a complete Riemannian manifold and its topology and global geometry.
The first five chapters are preparatory in nature. They begin with a very concise introduction to Riemannian geometry, followed by an exposition of Toponogov's theorem—the first such treatment in a book in English. Next comes a detailed presentation of homogeneous spaces in which the main goal is to find formulas for their curvature. A quick chapter of Morse theory is followed by one on the injectivity radius.
Chapters 6–9 deal with many of the most relevant contributions to the subject in the years 1959 to 1974. These include the pinching (or sphere) theorem, Berger's theorem for symmetric spaces, the differentiable sphere theorem, the structure of complete manifolds of nonnegative curvature, and finally, results about the structure of complete manifolds of nonpositive curvature. Emphasis is given to the phenomenon of rigidity, namely, the fact that although the conclusions which hold under the assumption of some strict inequality on curvature can fail when the strict inequality on curvature can fail when the strict inequality is relaxed to a weak one, the failure can happen only in a restricted way, which can usually be classified up to isometry.
Much of the material, particularly the last four chapters, was essentially stateoftheart when the book first appeared in 1975. Since then, the subject has exploded, but the material covered in the book still represents an essential prerequisite for anyone who wants to work in the field.
Graduate students and research mathematicians interested in Riemannian manifolds.

Chapters

Chapter 1. Basic concepts and results

Chapter 2. Toponogov’s theorem

Chapter 3. Homogeneous spaces

Chapter 4. Morse theory

Chapter 5. Closed geodesics and the cut locus

Chapter 6. The sphere theorem and its generalizations

Chapter 7. The differentiable sphere theorem

Chapter 8. Complete manifolds of nonnegative curvature

Chapter 9. Compact manifolds of nonpositive curvature

... this is a wonderful book, full of fundamental techniques and ideas.
Robert L. Bryant, Director of the Mathematical Sciences Research Institute 
Cheeger and Ebin's book is a truly important classic monograph in Riemannian geometry, with great continuing relevance.
Rafe Mazzeo, Stanford University 
Much of the material, particularly the last four chapters, was essentially stateoftheart when the book first appeared in 1975. Since then, the subject has exploded, but the material covered in the book still represents an essential prerequisite for anyone who wants to work in the field. To conclude, one can say that this book presents many interesting and recent results of global Riemannian geometry, and that by its well composed introductory chapters, the authors have managed to make it readable by nonspecialists.
Zentralblatt MATH