Verfügbarkeit: Riemannian geometry and geometric analysis

Riemannian geometry and geometric analysis:

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Bibliographische Detailangaben
1. Verfasser:	Jost, Jürgen 1956- (VerfasserIn)
Format:	Buch
Sprache:	English
Veröffentlicht:	Berlin [u.a.] Springer 2002
Ausgabe:	3. ed.
Schriftenreihe:	Universitext
Schlagworte:	Geometrische Analysis Riemannsche Geometrie
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	XIII, 532 S.
ISBN:	3540426272

Internformat

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Datensatz im Suchindex

_version_	1804128845523058688
adam_text	Contents 1. Foundational Material 1 1.1 Manifolds and Differentiable Manifolds 1 1.2 Tangent Spaces 5 1.3 Submanifolds 9 1.4 Riemannian Metrics 12 1.5 Vector Bundles 32 1.6 Integral Curves of Vector Fields. Lie Algebras 41 1.7 Lie Groups 50 1.8 Spin Structures 56 Exercises for Chapter 1 76 2. De Rham Cohomology and Harmonic Differential Forms 79 2.1 The Laplace Operator 79 2.2 Representing Cohomology Classes by Harmonic Forms .... 87 2.3 Generalizations 96 Exercises for Chapter 2 97 3. Parallel Transport, Connections, and Covariant Derivatives 101 3.1 Connections in Vector Bundles 101 3.2 Metric Connections. The Yang Mills Functional 110 3.3 The Levi Civita Connection 127 3.4 Connections for Spin Structures and the Dirac Operator ... 142 3.5 The Bochner Method 148 3.6 The Geometry of Submanifolds. Minimal Submanifolds .... 151 Exercises for Chapter 3 163 4. Geodesies and Jacobi Fields 165 4.1 1st and 2nd Variation of Arc Length and Energy 165 4.2 Jacobi Fields 172 4.3 Conjugate Points and Distance Minimizing Geodesies 180 4.4 Riemannian Manifolds of Constant Curvature 189 XII Contents 4.5 The Rauch Comparison Theorems and Other Jacobi Field Estimates 190 4.6 Geometric Applications of Jacobi Field Estimates 196 4.7 Approximate Fundamental Solutions and Representation Formulae 200 4.8 The Geometry of Manifolds of Nonpositive Sectional Curvature 202 Exercises for Chapter 4 219 A Short Survey on Curvature and Topology 223 5. Symmetric Spaces and Kahler Manifolds 231 5.1 Complex Projective Space. Definition of Kahler Manifolds . 231 5.2 The Geometry of Symmetric Spaces 241 5.3 Some Results about the Structure of Symmetric Spaces .... 252 5.4 The Space Sl(n,R)/SO(n,R) 258 5.5 Symmetric Spaces of Noncompact Type as Examples of Nonpositively Curved Riemannian Manifolds 275 Exercises for Chapter 5 279 6. Morse Theory and Floer Homology 281 6.1 Preliminaries: Aims of Morse Theory 281 6.2 Compactness: The Palais Smale Condition and the Existence of Saddle Points 286 6.3 Local Analysis: Nondegeneracy of Critical Points, Morse , Lemma, Stable and Unstable Manifolds 289 6.4 Limits of Trajectories of the Gradient Flow 305 6.5 The Morse Smale Floer Condition: Transversality and ! Z2 Cohomology 312 6.6 Orientations and Z homology 318 6.7 Homotopies 323 6.8 Graph flows 327 6.9 Orientations 331 6.10 The Morse Inequalities 347 6.11 The Palais Smale Condition and the Existence of Closed Geodesies 358 Exercises for Chapter 6 371 7. Variational Problems from Quantum Field Theory 373 7.1 The Ginzburg Landau Functional 373 7.2 The Seiberg Witten Functional 381 Exercises for Chapter 7 388 Contents XIII 8. Harmonic Maps 389 8.1 Definitions 389 8.2 Twodimensional Harmonic Mappings and Holomorphic Quadratic Differentials 395 8.3 The Existence of Harmonic Maps in Two Dimensions 408 8.4 Definition and Lower Semicontinuity of the Energy Integral 430 8.5 Weakly Harmonic Maps. Regularity Questions 441 8.6 Higher Regularity 456 8.7 Formulae for Harmonic Maps. The Bochner Technique .... 468 8.8 Harmonic Maps into Manifolds of Nonpositive Sectional Curvature: Existence 480 8.9 Harmonic Maps into Manifolds of Nonpositive Sectional Curvature: Regularity 486 8.10 Harmonic Maps into Manifolds of Nonpositive Sectional Curvature: Uniqueness and Other properties 503 Exercises for Chapter 8 511 Appendix A: Linear Elliptic Partial Differential Equation ... 515 A.I Sobolev Spaces 515 A.2 Existence and Regularity Theory for Solutions of Linear Elliptic Equations 519 Appendix B: Fundamental Groups and Covering Spaces .... 523 Index 527
any_adam_object	1
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spelling	Jost, Jürgen 1956- Verfasser (DE-588)115774564 aut Riemannian geometry and geometric analysis Jürgen Jost 3. ed. Berlin [u.a.] Springer 2002 XIII, 532 S. txt rdacontent n rdamedia nc rdacarrier Universitext Geometrische Analysis Riemannsche Geometrie Geometrische Analysis (DE-588)4156708-0 gnd rswk-swf Riemannsche Geometrie (DE-588)4128462-8 gnd rswk-swf Riemannsche Geometrie (DE-588)4128462-8 s Geometrische Analysis (DE-588)4156708-0 s 1\p DE-604 DE-604 HBZ Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=009577902&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis 1\p cgwrk 20201028 DE-101 https://d-nb.info/provenance/plan#cgwrk
spellingShingle	Jost, Jürgen 1956- Riemannian geometry and geometric analysis Geometrische Analysis Riemannsche Geometrie Geometrische Analysis (DE-588)4156708-0 gnd Riemannsche Geometrie (DE-588)4128462-8 gnd
subject_GND	(DE-588)4156708-0 (DE-588)4128462-8
title	Riemannian geometry and geometric analysis
title_auth	Riemannian geometry and geometric analysis
title_exact_search	Riemannian geometry and geometric analysis
title_full	Riemannian geometry and geometric analysis Jürgen Jost
title_fullStr	Riemannian geometry and geometric analysis Jürgen Jost
title_full_unstemmed	Riemannian geometry and geometric analysis Jürgen Jost
title_short	Riemannian geometry and geometric analysis
title_sort	riemannian geometry and geometric analysis
topic	Geometrische Analysis Riemannsche Geometrie Geometrische Analysis (DE-588)4156708-0 gnd Riemannsche Geometrie (DE-588)4128462-8 gnd
topic_facet	Geometrische Analysis Riemannsche Geometrie
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=009577902&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
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