Verfügbarkeit: Manifolds and differential geometry

Manifolds and differential geometry:

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Bibliographische Detailangaben
1. Verfasser:	Lee, Jeffrey M. 1956- (VerfasserIn)
Format:	Buch
Sprache:	English
Veröffentlicht:	Providence, RI American Math. Soc. 2009
Schriftenreihe:	Graduate studies in mathematics 107
Schlagworte:	Geometry, Differential Topological manifolds Riemannian manifolds Topologische Mannigfaltigkeit Differentialgeometrie Riemannscher Raum
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	Hier auch später erschienene, unveränderte Nachdrucke
Beschreibung:	XIV, 671 S. graph. Darst.
ISBN:	9780821848159

Internformat

MARC


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Datensatz im Suchindex

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adam_text	Contents Preface xi Chapter 1. Differentiable Manifolds 1 §1.1. Preliminaries 2 §1.2. Topological Manifolds 6 §1.3. Charts, Atlases and Smooth Structures 11 §1.4. Smooth Maps and Diffeomorphisms 22 §1.5. Cut-off Functions and Partitions of Unity 28 §1.6. Coverings and Discrete Groups 31 §1.7. Regular Submanifolds 46 §1.8. Manifolds with Boundary 48 Problems 51 Chapter 2. The Tangent Structure 55 §2.1. The Tangent Space 55 §2.2. Interpretations 65 §2.3. The Tangent Map 66 §2.4. Tangents of Products 72 §2.5. Critical Points and Values 74 §2.6. Rank and Level Set 78 §2.7. The Tangent and Cotangent Bundles 81 §2.8. Vector Fields 87 §2.9. 1-Forms 110 §2.10. Line Integrals and Conservative Fields 116 Contents §2.11. Moving Erames 12° Problems ■'•22 Chapter 3. Immersion and Submersion 127 §3.1. Immersions 127 §3.2. Immersed and Weakly Embedded Submanifolds 130 §3.3. Submersions 138 Problems 140 Chapter 4. Curves and Hypersurfaces in Euclidean Space 143 §4.1. Curves 145 §4.2. Hypersurfaces 152 §4.3. The Levi-Civita Covariant Derivative 165 §4.4. Area and Mean Curvature 178 §4.5. More on Gauss Curvature 180 §4.6. Gauss Curvature Heuristics 184 Problems 187 Chapter 5. Lie Groups 189 §5.1. Definitions and Examples 189 §5.2. Linear Lie Groups 192 §5.3. Lie Group Homomorphisms 201 §5.4. Lie Algebras and Exponential Maps 204 §5.5. The Adjoint Representation of a Lie Group 220 §5.6. The Maurer-Cartan Form 224 §5.7. Lie Group Actions 228 §5.8. Homogeneous Spaces 240 §5.9. Combining Representations 249 Problems 253 Chapter 6. Fiber Bundles 257 §6.1. General Fiber Bundles 257 §6.2. Vector Bundles 270 §6.3. Tensor Products of Vector Bundles 282 §6.4. Smooth Functors 283 §6.5. Hom 285 §6.6. Algebra Bundles 287 §6.7. Sheaves 288 Contents vii §6.8. Principal and Associated Bundles 291 Problems 303 Chapter 7. Tensors 307 §7.1. Some Multilinear Algebra 308 §7.2. Bottom-Up Approach to Tensor Fields 318 §7.3. Тор -Down Approach to Tensor Fields 323 §7.4. Matching the Two Approaches to Tensor Fields 324 §7.5. Tensor Derivations 327 §7.6. Metric Tensors 331 Problems 342 Chapter 8. Differential Forms 345 §8.1. More Multilinear Algebra 345 §8.2. Differential Forms 358 §8.3. Exterior Derivative 363 §8.4. Vector-Valued and Algebra-Valued Forms 367 §8.5. Bundle-Valued Forms 370 §8.6. Operator Interactions 373 §8.7. Orientation 375 §8.8. Invariant Forms 384 Problems 388 Chapter 9. Integration and Stokes' Theorem 391 §9.1. Stokes' Theorem 394 §9.2. Differentiating Integral Expressions; Divergence 397 §9.3. Stokes' Theorem for Chains 400 §9.4. Differential Forms and Metrics 404 §9.5. Integral Formulas 414 §9.6. The Hodge Decomposition 418 §9.7. Vector Analysis on R3 425 §9.8. Electromagnetism 429 §9.9. Surface Theory Redux 434 Problems 437 Chapter 10. De Rham Cohomoiogy 441 §10.1. The Mayer-Vietoris Sequence 447 §10.2. Homotopy Invariance 449 viii Contents §10.3. Compactly Supported Cohomology 456 §10.4. Poincaré Duality 460 Problems 465 Chapter 11. Distributions and Frobenius' Theorem 467 §11.1. Definitions 468 §11.2. The Local Probenius Theorem 471 §11.3. Differential Forms and Integrability 473 §11.4. Global Probenius Theorem 478 §11.5. Applications to Lie Groups 484 §11.6. Fundamental Theorem of Surface Theory 486 §11.7. Local Fundamental Theorem of Calculus 494 Problems 498 Chapter 12. Connections and Covariant Derivatives 501 §12.1. Definitions 501 §12.2. Connection Forms 506 §12.3. Differentiation Along a Map 507 §12.4. Ehresmann Connections 509 §12.5. Curvature 525 §12.6. Connections on Tangent Bundles 530 §12.7. Comparing the Differential Operators 532 §12.8. Higher Covariant Derivatives 534 §12.9. Exterior Covariant Derivative 536 §12.10. Curvature Again 540 §12.11. The Bianchi Identity 541 §12.12. G-Connections 542 Problems 544 Chapter 13. Riemannian and Semi-Riemannian Geometry 547 §13.1. Levi-Civita Connection 550 §13.2. Riemann Curvature Tensor 553 §13.3. Semi-Riemannian Submanifolds 560 §13.4. Geodesies 567 §13.5. Riemannian Manifolds and Distance 585 §13.6. Lorentz Geometry 588 §13.7. Jakobi Fields 594 Contents ix §13.8. First and Second Variation of Arc Length 599 §13.9. More Riemannian Geometry 612 §13.10. Cut Locus 617 §13.11. Rauch's Comparison Theorem 619 §13.12. Weitzenböck Formulas 623 §13.13. Structure of General Relativity 627 Problems 634 Appendix A. The Language of Category Theory 637 Appendix B. Topology 643 ŞB.1. The Shrinking Lemma 643 §B.2. Locally Euclidean Spaces 645 Appendix C. Some Calculus Theorems 647 Appendix D. Modules and Multilinearity 649 §D.l. R-Algebras 660 Bibliography 663 Index 667
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spelling	Lee, Jeffrey M. 1956- Verfasser (DE-588)14026714X aut Manifolds and differential geometry Jeffrey M. Lee Providence, RI American Math. Soc. 2009 XIV, 671 S. graph. Darst. txt rdacontent n rdamedia nc rdacarrier Graduate studies in mathematics 107 Hier auch später erschienene, unveränderte Nachdrucke Geometry, Differential Topological manifolds Riemannian manifolds Topologische Mannigfaltigkeit (DE-588)4185712-4 gnd rswk-swf Differentialgeometrie (DE-588)4012248-7 gnd rswk-swf Riemannscher Raum (DE-588)4128295-4 gnd rswk-swf Differentialgeometrie (DE-588)4012248-7 s Topologische Mannigfaltigkeit (DE-588)4185712-4 s Riemannscher Raum (DE-588)4128295-4 s DE-604 Erscheint auch als Online-Ausgabe 978-1-4704-1170-1 Graduate studies in mathematics 107 (DE-604)BV009739289 107 Digitalisierung UB Regensburg application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=017737052&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Lee, Jeffrey M. 1956- Manifolds and differential geometry Graduate studies in mathematics Geometry, Differential Topological manifolds Riemannian manifolds Topologische Mannigfaltigkeit (DE-588)4185712-4 gnd Differentialgeometrie (DE-588)4012248-7 gnd Riemannscher Raum (DE-588)4128295-4 gnd
subject_GND	(DE-588)4185712-4 (DE-588)4012248-7 (DE-588)4128295-4
title	Manifolds and differential geometry
title_auth	Manifolds and differential geometry
title_exact_search	Manifolds and differential geometry
title_full	Manifolds and differential geometry Jeffrey M. Lee
title_fullStr	Manifolds and differential geometry Jeffrey M. Lee
title_full_unstemmed	Manifolds and differential geometry Jeffrey M. Lee
title_short	Manifolds and differential geometry
title_sort	manifolds and differential geometry
topic	Geometry, Differential Topological manifolds Riemannian manifolds Topologische Mannigfaltigkeit (DE-588)4185712-4 gnd Differentialgeometrie (DE-588)4012248-7 gnd Riemannscher Raum (DE-588)4128295-4 gnd
topic_facet	Geometry, Differential Topological manifolds Riemannian manifolds Topologische Mannigfaltigkeit Differentialgeometrie Riemannscher Raum
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=017737052&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV009739289
work_keys_str_mv	AT leejeffreym manifoldsanddifferentialgeometry

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