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Functional differential geometry/ Gerald Jay Sussman

By: Sussman, Gerald JayMaterial type: Text

TextPublication details: London: The MIT Press, 2013-07-05Description: 228pISBN: 0262019345DDC classification: 516.36

Contents:

2.1 Coordinate Functions 12 2.2 Manifold Functions 14 3 Vector Fields and One-Form Fields 21 3.1 Vector Fields 21 3.2 Coordinate-Basis Vector Fields 26 3.3 Integral Curves 29 3.4 One-Form Fields 32 3.5 Coordinate-Basis One-Form Fields 34 4 Basis Fields 41 4.1 Change of Basis 44 4.2 Rotation Basis 47 4.3 Commutators 48 5 Integration 55 5.1 Higher Dimensions 57 5.2 Exterior Derivative 62 5.3 Stokes's Theorem 65 viii Contents 5.4 Vector Integral Theorems 67 6 Over a Map 71 6.1 Vector Fields Over a Map 71 6.2 One-Form Fields Over a Map 73 6.3 Basis Fields Over a Map 74 6.4 Fullbacks and Pushforwards 76 7 Directional Derivatives 83 7.1 Lie Derivative 85 7.2 Covariant Derivative 93 7.3 Parallel Transport 104 7.4 Geodesic Motion 111 8 Curvature 115 8.1 ExpLIcit Transport 116 8.2 Torsion 124 8.3 Geodesic Deviation 125 8.4 Bianchi Identities 129 9 Metrics 133 9.1 Metric Compatibility 135 9.2 Metrics and Lagrange Equations 137 9.3 General Relativity 144 10 Hodge Star and Electrodynamics 153 10.1 The Wave Equation 159 10.2 Electrodynamics 160 11 Special Relativity 167 11.1 Lorentz Transformations 172 11.2 Special Relativity Frames 179

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Holdings
Item type	Current library	Call number	Status	Date due	Barcode	Item holds
General Books	Central Library, Sikkim University General Book Section	516.36 SUS/F (Browse shelf(Opens below))	Available		P34847

Total holds: 0

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Previous	516.36 PRE/E Elementary Differential Geometry/	516.36 SHA/D Differential Geometry. Cartan's Generalization of Klein's Erlangen Program/	516.36 SOE/S Solving differential equations in R/	516.36 SUS/F Functional differential geometry/	516.362 GIU/M Minimal surfaces and functions of bounded variation/	516.362 NAB/T Topology, geometry and guage fields: foundations/	516.362 SAG/S Space-filling curves/	Next

2.1 Coordinate Functions 12
2.2 Manifold Functions 14
3 Vector Fields and One-Form Fields 21
3.1 Vector Fields 21
3.2 Coordinate-Basis Vector Fields 26
3.3 Integral Curves 29
3.4 One-Form Fields 32
3.5 Coordinate-Basis One-Form Fields 34
4 Basis Fields 41
4.1 Change of Basis 44
4.2 Rotation Basis 47
4.3 Commutators 48
5 Integration 55
5.1 Higher Dimensions 57
5.2 Exterior Derivative 62
5.3 Stokes's Theorem 65
viii Contents
5.4 Vector Integral Theorems 67
6 Over a Map 71
6.1 Vector Fields Over a Map 71
6.2 One-Form Fields Over a Map 73
6.3 Basis Fields Over a Map 74
6.4 Fullbacks and Pushforwards 76
7 Directional Derivatives 83
7.1 Lie Derivative 85
7.2
Covariant Derivative 93
7.3 Parallel Transport 104
7.4 Geodesic Motion 111
8 Curvature 115
8.1 ExpLIcit Transport 116
8.2 Torsion 124
8.3 Geodesic Deviation 125
8.4 Bianchi Identities 129
9 Metrics 133
9.1 Metric Compatibility 135
9.2 Metrics and Lagrange Equations 137
9.3 General Relativity 144
10 Hodge Star and Electrodynamics 153
10.1 The Wave Equation 159
10.2 Electrodynamics 160
11 Special Relativity 167
11.1 Lorentz Transformations 172
11.2 Special Relativity Frames 179

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