Overview

This book, based on a graduate course on Riemannian geometryand analysis onmanifolds, given in Paris, covers the topicsof differential manifolds, Riemannian metrics, connections,geodesics and curvature, with special emphasis on theintrinsic features on the subject.Classical results on the relations between curvature andtopology are treated in detail. The bookis quiteself-contained, assuming of the reader only a knowledge ofdifferential calculus in Euclidean space. It containsnumerous exercises with full solutions and a series ofdetailed examples which are picked up again repeatedly toillustrate each new definition or property introduced.This book addresses both the graduate student wanting tolearn Riemannian geometry, and also the professionalmathematician from a neighbouring field who needsinformation about ideas and techniques which are nowpervading many parts of mathematics.

Full Product Details

Author:   Sylvestre Gallot ,  Dominique Hulin ,  Jacques Lafontaine
Publisher:   Springer-Verlag Berlin and Heidelberg GmbH & Co. KG
Imprint:   Springer-Verlag Berlin and Heidelberg GmbH & Co. K
Edition:   2nd ed. 1990. Corr. 2nd printing 1993. 3rd printing
Dimensions:   Width: 15.50cm , Height: 1.60cm , Length: 23.50cm
Weight:   0.480kg
ISBN:  

9783540524014

ISBN 10:   3540524010
Pages:   286
Publication Date:   01 September 2001
Audience:   College/higher education ,  Professional and scholarly ,  Postgraduate, Research & Scholarly ,  Professional & Vocational
Replaced By:   9783540204930
Format:   Paperback
Publisher's Status:   Out of Print
Availability:   Out of stock  

Table of Contents

I. Differential Manifolds.- A. From Submanifolds to Abstract Manifolds.- Submanifolds of Rn+k.- Abstract manifolds.- Smooth maps.- B. Tangent Bundle.- Tangent space to a submanifold of Rn+k.- The manifold of tangent vectors.- Vector bundles.- Differential map.- C. Vector Fields.- Definitions.- Another definition for the tangent space.- Integral curves and flow of a vector field.- Image of a vector field under a diffeomorphism.- D. Baby Lie Groups.- Definitions.- Adjoint representation.- E. Covering Maps and Fibrations.- Covering maps and quotient by a discrete group.- Submersions and fibrations.- Homogeneous spaces.- F. Tensors.- Tensor product (digest).- Tensor bundles.- Operations on tensors.- Lie derivatives.- Local operators, differential operators.- A characterization for tensors.- G. Exterior Forms.- Definitions.- Exterior derivative.- Volume forms.- Integration on an oriented manifold.- Haar measure on a Lie group.- H. Appendix: Partitions of Unity.- II. Riemannian Metrics.- A. Existence Theorems and First Examples.- Definitions.- First examples.- Examples: Riemannian submanifolds, product Riemannian manifolds.- Riemannian covering maps, flat tori.- Riemannian submersions, complex projective space.- Homogeneous Riemannian spaces.- B. Covariant Derivative.- Connections.- Canonical connection of a Riemannian submanifold.- Extension of the covariant derivative to tensors.- Covariant derivative along a curve.- Parallel transport.- Examples.- C. Geodesics.- Definitions.- Local existence and uniqueness for geodesics, exponential map.- Riemannian manifolds as metric spaces.- Complete Riemannian manifolds, Hopf-Rinow theorem.- Geodesies and submersions, geodesies of PnC.- Cut locus.- III. Curvature.- A. The Curvature Tensor.- Second covariant derivative.- Algebraic properties of the curvature tensor.- Computation of curvature: some examples.- Ricci curvature, scalar curvature.- B. First and Second Variation of Arc-Length and Energy.- Technical preliminaries: vector fields along parameterized submanifolds.- First variation formula.- Second variation formula.- C. Jacobi Vector Fields.- Basic topics about second derivatives.- Index form.- Jacobi fields and exponential map.- Applications: Sn, Hn, PnR, 2-dimensional Riemannian manifolds.- D. Riemannian Submersions and Curvature.- Riemannian submersions and connections.- Jacobi fields of PnC.- O'Neill's formula.- Curvature and length of small circles. Application to Riemannian submersions.- E. The Behavior of Length and Energy in the Neighborhood of a Geodesic.- The Gauss lemma.- Conjugate points.- Some properties of the cut-locus.- F. Manifolds with Constant Sectional Curvature.- Spheres, Euclidean and hyperbolic spaces.- G. Topology and Curvature.- The Myers and Hadamard-Cartan theorems.- H. Curvature and Volume.- Densities on a differentiable manifold.- Canonical measure of a Riemannian manifold.- Examples: spheres, hyperbolic spaces, complex projective spaces.- Small balls and scalar curvature.- Volume estimates.- I. Curvature and Growth of the Fundamental Group.- Growth of finite type groups.- Growth of the fundamental group of compact manifolds with negative curvature.- J. Curvature and Topology: An Account of Some Old and Recent Results.- Traditional point of view: pinched manifolds.- Almost flat pinching.- Coarse point of view: compactness theorems of Cheeger and Gromov.- K. Curvature Tensors and Representations of the Orthogonal Group.- Decomposition of the space of curvature tensors.- Conformally flat manifolds.- The second Bianchi identity.- L. Hyperbolic Geometry.- Angles and distances in the hyperbolic plane.- Polygons with many right angles.- Compact surfaces.- Hyperbolic trigonometry.- Prescribing constant negative curvature.- M. Conformai Geometry.- The Moebius group.- Conformai, elliptic and hyperbolic geometry.- IV. Analysis on Manifolds and the Ricci Curvature.- A. Manifolds with Boundary.- Definition.- The Stokes theorem and integration by parts.- B. Bishop's Inequality Revisited.- Some commutations formulas.- Laplacian of the distance function.- Another proof of Bishop's inequality.- The Heintze-Karcher inequality.- C. Differential Forms and Cohomology.- The de Rham complex.- Differential operators and their formal adjoints.- The Hodge-de Rham theorem.- A second visit to the Bochner method.- D. Basic Spectral Geometry.- The Laplace operator and the wave equation.- Statement of the basic results on the spectrum.- E. Some Examples of Spectra.- The spectrum of flat tori.- Spectrum of (Sn, can).- F. The Minimax Principle.- The basic statements.- G. The Ricci Curvature and Eigenvalues Estimates.- Bishop's inequality and coarse estimates.- Some consequences of Bishop's theorem.- Lower bounds for the first eigenvalue.- H. Paul Levy's Isoperimetric Inequality.- The statement.- The proof.- V. Riemannian Submanifolds.- A. Curvature of Submanifolds.- Second fundamental form.- Curvature of hypersurfaces.- Application to explicit computations of curvatures.- B. Curvature and Convexity.- The Hadamard theorem.- C. Minimal Surfaces.- First results.- Some Extra Problems.- Solutions of Exercises.- I.- II.- III.- IV.- V.

Reviews

From the reviews of the third edition: This new edition maintains the clear written style of the original, including many illustrations examples and exercises (most with solutions). (Joseph E. Borzellino, Mathematical Reviews, 2005) This book based on graduate course on Riemannian geometry covers the topics of differential manifolds, Riemannian metrics, connections, geodesics and curvature, with special emphasis on the intrinsic features of the subject. Classical results are treated in detail. contains numerous exercises with full solutions and a series of detailed examples which are picked up repeatedly to illustrate each new definition or property introduced. For this third edition, some topics have been added and worked out in the same spirit. (L'ENSEIGNEMENT MATHEMATIQUE, Vol. 50, (3-4), 2004) This book is based on a graduate course on Riemannian geometry and analysis on manifolds that was held in Paris. Classical results on the relations between curvature and topology are treated in detail. The book is almost self-contained, assuming in general only basic calculus. It contains nontrivial exercises with full solutions at the end. Properties are always illustrated by many detailed examples. (EMS Newsletter, December 2005) The guiding line of this by now classic introduction to Riemannian geometry is an in-depth study of each newly introduced concept on the basis of a number of reoccurring well-chosen examples . The book continues to be an excellent choice for an introduction to the central ideas of Riemannian geometry. (M. Kunzinger, Monatshefte f r Mathematik, Vol. 147 (1), 2006)

From the reviews of the third edition: This new edition maintains the clear written style of the original, including many illustrations ... examples and exercises (most with solutions). (Joseph E. Borzellino, Mathematical Reviews, 2005) This book based on graduate course on Riemannian geometry ... covers the topics of differential manifolds, Riemannian metrics, connections, geodesics and curvature, with special emphasis on the intrinsic features of the subject. Classical results ... are treated in detail. ... contains numerous exercises with full solutions and a series of detailed examples which are picked up repeatedly to illustrate each new definition or property introduced. For this third edition, some topics ... have been added and worked out in the same spirit. (L'ENSEIGNEMENT MATHEMATIQUE, Vol. 50, (3-4), 2004) This book is based on a graduate course on Riemannian geometry and analysis on manifolds that was held in Paris. ... Classical results on the relations between curvature and topology are treated in detail. The book is almost self-contained, assuming in general only basic calculus. It contains nontrivial exercises with full solutions at the end. Properties are always illustrated by many detailed examples. (EMS Newsletter, December 2005) The guiding line of this by now classic introduction to Riemannian geometry is an in-depth study of each newly introduced concept on the basis of a number of reoccurring well-chosen examples ... . The book continues to be an excellent choice for an introduction to the central ideas of Riemannian geometry. (M. Kunzinger, Monatshefte fur Mathematik, Vol. 147 (1), 2006)

Author Information

Tab Content 6

Author Website:  

Customer Reviews

Recent Reviews

No review item found!

Add your own review!

Countries Available

All regions