Graduate Texts in Mathematics

1 Graduate Texts in Mathematics TAKE~~~~AIUNG. Introduction to Axiomatic Set Theory. 2nd ed. OXTOBY. Measure and Category. 2nd ed. SCHAEFER. Topological Vector Spaces. HILTONISTAMMBACH. A Course in Homological algebra . 2nd ed. MAC LANE. Categories for the Working Mathematician. HUGWPPER. Projective Planes. SERRE. A Come in Arithmetic. TAKE~~~~AIUNG. Axiomatic Set Theory. HUMPHREYS. Introduction to Lie Algebras and Representation Theory. COHEN. A Course in Simple Homotopy Theory. CONWAY. Functions of One Complex Variable I. 2nd ed.

2 B'EALS. Advanced Mathematical Analysis. ANDERSON/FWLLER. Rings and Categories of Modules. 2nd ed. GOLUB~~SKY/G~. Stable Mappings and Their Singularities. BERBERIAN. Lectures in Functional Analysis and Operator Theory. Wm. The Structure of Fields. ROSENBLATT. Random Processes. 2nd ed. HALMos. Measure Theory. HALMos. A Hilbert Space Problem Book. 2nd ed. HUSEMOLLER. Fibre Bundles. 3rd ed. HUMPHREYS. linear Algebraic Groups. BARN~MACK. An Algebraic Introduction to Mathematical Logic. GREUB. linear algebra . 4th ed. HOLIUIES. Geometric Functional Analysis and Its Applications.

3 HEW~~~/STROMBERG. Real and Abstract Analysis. MANES. Algebraic Theories. KFLLEY. General Topology. ZARISKI~SAMIJEL. Commutative algebra . - ZAR~SKJISAMLEL. Commutative algebra . JACOBSON. Lectures in Abstract algebra I. Basic Concepts. JACOBSON. Lectures in Abstract algebra II. linear algebra . JACOBSON. Lectures in Abstract algebra III. Theory of Fields and Galois Theory. HIRSCH. Differential Topology. SP~IZER. Principles of Random Walk. 2nd ed. WERMER. Banach Algebras and Several Complex Variables. 2nd ed. KELLEY/NAMIoKA et d.

4 linear Topological Spaces. MONK. Mathematical Logic. GRAUERT/FRI~ZSCHE. Several Complex Variables. ARVESON. An Invitation to C-Algebras. KEMENYISNELLJKNAPP. Denumerable Markov Chains. 2nd ed. APOSTOL. Modular Functions and Dichlet Series in Number Theory. 2nd ed. SERRE. linear Representations of Finite Groups. GWJERISON. Rings of Continuous Functions. KENDIG. Elementary Algebraic Geometry. LoiVE. Probability Theory I. 4th ed. LOEVE. Probability Theory II. 4th ed. MOISE. Geometric Topology in Dimensions 2 and 3. S~msMru. General Relativity for Mathematicians.

5 GRUENBER~~WEIR. Liar Geometry. 2nd ed. EDWARDS. Fennat's Last Theorem. KLJNGENBERG. A Course in Differential Geometry. HARTSHORNE. Algebraic Geometry. MANIN. A Course in Mathematical Logic. GRAWATKINS. Combinatorics with Emphasis on the Theory of Graphs. BROWNJPEARCY. Introduction to Operator Theory I: Elements of Functional Analysis. MASSEY. Algebraic Topology: An Introduction. CROWELLJFOX. Introduction to Knot Theory. KOBL~. p-adic Numbers, padic Analysis, and Zeta-Functions. 2nd ed. LANG. Cyclotomic Fields. ARNOLD. Mathematical Methods in Classical Mechanics.

6 2nd ed. continued afer index John M. Lee Riemannian Manifolds An Introduction to Curvature With 88 Illustrations Springer John M. Lee Department of Mathematics University of Washington Seattle, WA 981 95-4350 USA Editorial Board S. Axler Gekng Halmos Department of Department of Department of Mathematics Mathematics Mathematics Michigan State University University of Michigan Santa Clara University East Lansing, MI 48824 Ann Arbor, MI 48109 Santa Clara, CA 95053 USA USA USA Mathematics Subject Classification (1991): 53-01, 53C20 Library of Congress Cataloging-in-Publication Data Lee, John M.

7 , 1950- Reimannian manifolds : an introduction to curvature I John M. Lee. p. cm. - ( Graduate Texts in Mathematics ; 176) Includes index. ISBN 0-387-98271-X (hardcover : alk. paper) 1. Reimannian manifolds. I. Title. 11. Series. 1997 '734~21 O 1997 Springer-Verlag New York, Inc. All rights reserved. This work may not be translated or copied in whole or in part without the written permission of the publisher (Springer-Verlag New York, Inc., 175 Fifth Avenue, New York, NY 10010, USA), except for brief excerpts in connection with reviews or scholarly analysis.

8 Use in con- nection with any form of information storage and retrieval, electronic adaptation, computer software, or by similar or dissimilar methodology now known or hereafter developed is forbidden. The use of general descriptive names, trade names, trademarks, etc., in this publication, even if the former are not especially identified, is not to be taken as a sign that such names, as understood by the Trade Marks and Merchandise Marks Act, may accordingly be used freely by anyone. ISBN 0-387-98271-X Springer-Verlag New York Berlin Heidelberg SPIN 10630043 (hardcover) ISBN 0-387-98322-8 Springer-Verlag New York Berlin Heidelberg SPIN 10637299 (softcover) To my family:Pm, Nathan, and Jeremy WeizenbaumPrefaceThis book is designed as a textbook for a one-quarter or one-semester grad-uate course on Riemannian geometry, for students who are familiar withtopological and differentiable manifolds.

9 It focuses on developing an inti-mate acquaintance with the geometric meaning of curvature. In so doing, itintroduces and demonstrates the uses of all the main technical tools neededfor a careful study of Riemannian have selected a set of topics that can reasonably be covered in ten tofifteen weeks, instead of making any attempt to provide an encyclopedictreatment of the subject. The book begins with a careful treatment of themachinery of metrics, connections, and geodesics, without which one cannotclaim to be doing Riemannian geometry.

10 It then introduces the Riemanncurvature tensor, and quickly moves on to submanifold theory in order togive the curvature tensor a concrete quantitative interpretation. From thenon, all efforts are bent toward proving the four most fundamental theoremsrelating curvature and topology: the Gauss Bonnet theorem (expressingthe total curvature of a surface in terms of its topological type), the Cartan Hadamard theorem (restricting the topology of manifolds of nonpositivecurvature), Bonnet s theorem (giving analogous restrictions on manifoldsof strictly positive curvature), and a special case of the Cartan Ambrose Hicks theorem (characterizing manifolds of constant curvature).