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Tensor Calculus
2020-09-05 08:46:12
1. Spaces and Tensors 1.1 The generalized idea of a space 1.2 Transformation of coordinates. Summation convention 1.3 Contravariant vectors and tensors. Invariants 1.4 Covariant vectors and tensors. Mixed tensors 1.5 Add...
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1. Spaces and Tensors
1.1 The generalized idea of a space
1.2 Transformation of coordinates. Summation convention
1.3 Contravariant vectors and tensors. Invariants
1.4 Covariant vectors and tensors. Mixed tensors
1.5 Addition, multiplication, and contraction of tensors
1.6 Tests for tensor character
1.7 Compressed notation
Summary I, Exercises I
II. Basic Operations in Riemannian Space
2.1 The metric tensor and the line element
2.2 The conjugate tensor. Lowering and raising suffixes
2.3 Magnitude of a vector. Angle between vectors
2.4 Geodesics and geodesic null lines. Christoffel symbols
2.5 Derivatives of tensors
2.6 Special coordinate systems
2.7 Frenet formulae
Summary II, Exercises II
III. Curvature of Space
3.1 The curvature tensor
3.2 The Ricci tensor, the curvature invariant, and the Einstein tensor
3.3 Geodesic deviation
3.4 Riemannian curvature
3.5 Parallel propagation
Summary III, Exercises III
IV. Special Types of Space
4.1 Space of constant curvature
4.2 Flat space
4.3 Cartesian tensors
4.4 A space of constant curvature regarded as a sphere in a flat space
Summary IV, Exercises IV
V. Applications to Classical Dynamics
5.1 Physical components of tensors
5.2 Dynamics of a particle
5.3 Dynamics of a rigid body
5.4 Moving frames of reference
5.5 General dynamical systems
Summary V, Exercises V
VI. Applications to hydrodynamics, elasticity, and electromagnetic radiation
6.1 Hydrodynamics
6.2 Elasticity
6.3 Electromagnetic radiation
Summary VI, Exercises VI
VII. Relative Tensors, Ideas of Volume, Green-Stokes Theorems
7.1 Relative tensors, generalized Kronecker delta, permutation symbol
7.2 Change of weight. Differentiation
7.3 Extension
7.4 Volume
7.5 Stokes'' theorem
7.6 Green''s theorem
Summary VII, Exercises VII
VIII. Non-Riemannian spaces
8.1 Absolute derivative. Spaces with a linear connection. Paths
8.2 Spaces with symmetric connection. Curvature
8.3 Weyl spaces. Riemannian spaces. Projective spaces
Summary VIII, Exercises VIII
Appendix A. Reduction of a Quadratic Form
Appendix B. Multiple integration
Bibliography, Index Less
1.1 The generalized idea of a space
1.2 Transformation of coordinates. Summation convention
1.3 Contravariant vectors and tensors. Invariants
1.4 Covariant vectors and tensors. Mixed tensors
1.5 Addition, multiplication, and contraction of tensors
1.6 Tests for tensor character
1.7 Compressed notation
Summary I, Exercises I
II. Basic Operations in Riemannian Space
2.1 The metric tensor and the line element
2.2 The conjugate tensor. Lowering and raising suffixes
2.3 Magnitude of a vector. Angle between vectors
2.4 Geodesics and geodesic null lines. Christoffel symbols
2.5 Derivatives of tensors
2.6 Special coordinate systems
2.7 Frenet formulae
Summary II, Exercises II
III. Curvature of Space
3.1 The curvature tensor
3.2 The Ricci tensor, the curvature invariant, and the Einstein tensor
3.3 Geodesic deviation
3.4 Riemannian curvature
3.5 Parallel propagation
Summary III, Exercises III
IV. Special Types of Space
4.1 Space of constant curvature
4.2 Flat space
4.3 Cartesian tensors
4.4 A space of constant curvature regarded as a sphere in a flat space
Summary IV, Exercises IV
V. Applications to Classical Dynamics
5.1 Physical components of tensors
5.2 Dynamics of a particle
5.3 Dynamics of a rigid body
5.4 Moving frames of reference
5.5 General dynamical systems
Summary V, Exercises V
VI. Applications to hydrodynamics, elasticity, and electromagnetic radiation
6.1 Hydrodynamics
6.2 Elasticity
6.3 Electromagnetic radiation
Summary VI, Exercises VI
VII. Relative Tensors, Ideas of Volume, Green-Stokes Theorems
7.1 Relative tensors, generalized Kronecker delta, permutation symbol
7.2 Change of weight. Differentiation
7.3 Extension
7.4 Volume
7.5 Stokes'' theorem
7.6 Green''s theorem
Summary VII, Exercises VII
VIII. Non-Riemannian spaces
8.1 Absolute derivative. Spaces with a linear connection. Paths
8.2 Spaces with symmetric connection. Curvature
8.3 Weyl spaces. Riemannian spaces. Projective spaces
Summary VIII, Exercises VIII
Appendix A. Reduction of a Quadratic Form
Appendix B. Multiple integration
Bibliography, Index Less
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