Differential Geometry - Analysis and Physics - J. Lee.pdf - pomieszane ENG - bartus24

Di‹erentialGeometry,AnalysisandPhysics

Je‹reyM.Lee

c 2000Je‹reyMarclee

Contents

0.1Preface ................................viii

1PreliminariesandLocalTheory 1

1.1Calculus................................ 2

1.2ChainRule,ProductruleandTaylor’sTheorem......... 11

1.3Localtheoryofmaps......................... 11

2Di‹erentiableManifolds 15

2.1RoughIdeasI............................. 15

2.2TopologicalManifolds........................ 16

2.3Di‹erentiableManifoldsandDi‹erentiableMaps......... 17

2.4Pseudo-GroupsandModelsSpaces................. 22

2.5SmoothMapsandDi‹eomorphisms................ 27

2.6CoveringsandDiscretegroups ................... 30

2.6.1Coveringspacesandthefundamentalgroup........ 30

2.6.2DiscreteGroupActions................... 36

2.7Grassmannianmanifolds....................... 39

2.8PartitionsofUnity.......................... 40

2.9Manifoldswithboundary. ...................... 43

3TheTangentStructure 47

3.1RoughIdeasII............................ 47

3.2TangentVectors ........................... 48

3.3Interpretations............................ 53

3.4TheTangentMap.......................... 54

3.5TheTangentandCotangentBundles................ 55

3.5.1TangentBundle........................ 55

3.5.2TheCotangentBundle.................... 57

3.6ImportantSpecialSituations..................... 59

4Submanifold,ImmersionandSubmersion. 63

4.1Submanifolds............................. 63

4.2Submanifoldsof R n .......................... 65

4.3RegularandCriticalPointsandValues............... 66

4.4Immersions.............................. 70

iii

iv CONTENTS

4.5ImmersedSubmanifoldsandInitialSubmanifolds......... 71

4.6Submersions.............................. 75

4.7MorseFunctions ........................... 77

4.8Problemset.............................. 79

5LieGroupsI 81

5.1DeﬁnitionsandExamples...................... 81

5.2LieGroupHomomorphisms..................... 84

6FiberBundlesandVectorBundlesI 87

6.1TransitionsMapsandStructure................... 94

6.2Usefulwaystothinkaboutvectorbundles............. 94

6.3SectionsofaVectorBundle..................... 97

6.4Sheaves,GermsandJets....................... 98

6.5JetsandJetbundles.........................102

7VectorFieldsand1-Forms 105

7.1Deﬁnitionofvectorﬁeldsand1-forms...............105

7.2Pullbackandpushforwardoffunctionsand1-forms.......106

7.3FrameFields.............................107

7.4LieBracket..............................108

7.5Localization..............................110

7.6Actionbypullbackandpush-forward................112

7.7FlowsandVectorFields.......................114

7.8LieDerivative.............................117

7.9TimeDependentFields .......................123

8LieGroupsII 125

8.1Spinorsandrotation.........................133

9MultilinearBundlesandTensorsFields 137

9.1MultilinearAlgebra..........................137

9.1.1Contractionoftensors....................141

9.1.2AlternatingMultilinearAlgebra...............142

9.1.3Orientationonvectorspaces ................146

9.2MultilinearBundles .........................147

9.3TensorFields.............................147

9.4TensorDerivations..........................149

10Di‹erentialforms 153

10.1Pullbackofadi‹erentialform. ...................155

10.2ExteriorDerivative..........................156

10.3Maxwell’sequations. ........................159

10.4Liederivative,interiorproductandexteriorderivative.......161

10.5TimeDependentFields(PartII)..................163

10.6Vectorvaluedandalgebravaluedforms...............163

CONTENTS

10.7GlobalOrientation..........................165

10.8Orientationofmanifoldswithboundary..............167

10.9IntegrationofDi‹erentialForms...................168

10.10Stokes’Theorem...........................170

10.11VectorBundleValuedForms.....................172

11DistributionsandFrobenius’Theorem 175

11.1Deﬁnitions...............................175

11.2IntegrabilityofRegularDistributions ...............175

11.3ThelocalversionFrobenius’theorem................177

11.4Foliations...............................182

11.5TheGlobalFrobeniusTheorem...................183

11.6SingularDistributions........................185

12ConnectionsonVectorBundles 189

12.1Deﬁnitions...............................189

12.2LocalFrameFieldsandConnectionForms.............191

12.3ParallelTransport ..........................193

12.4Curvature...............................198

13Riemannianandsemi-RiemannianManifolds 201

13.1TheLinearTheory..........................201

13.1.1ScalarProducts .......................201

13.1.2NaturalExtensionsandtheStarOperator.........203

13.2SurfaceTheory............................208

13.3Riemannianandsemi-RiemannianMetrics.............214

13.4TheRiemanniancase(positivedeﬁnitemetric)..........220

13.5Levi-CivitaConnection........................221

13.6Covariantdi‹erentiationofvectorﬁeldsalongmaps........228

13.7Covariantdi‹erentiationoftensorﬁelds..............229

13.8ComparingtheDi‹erentialOperators ...............230

14FormalismsforCalculation 233

14.1TensorCalculus............................233

14.2CovariantExteriorCalculus,Bundle-ValuedForms........234

15Topology 235

15.1AttachingSpacesandQuotientTopology.............235

15.2TopologicalSum...........................239

15.3Homotopy...............................239

15.4CellComplexes............................241

16AlgebraicTopology 245

16.1AxiomsforaHomologyTheory...................245

16.2SimplicialHomology.........................246

16.3SingularHomology..........................246

Differential Geometry - Analysis and Physics - J. Lee.pdf

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