Author(s): A. Logunov, M. Mestvirishvili
Publisher: Mir Publishers
Language: English
City: Moscow
Contents
Preface
Introduction
1. Critical Remarks Concerning the Equivalence Principle
2. Energy-Momeotum Pseudotensers of the Gravitational Field in GR
3. lnertial Mass in GR
4 Energy-Momentum Conservation in GR
5. Energy-Momentum and Angular Momentum Conservation as related to geometry of Space-Time
6. The Geometrization Principle and General RTG relations
7. The Basic Identity
8. RTG Equations
9. Relationships between Canonical Energy-Momentum Tensor and the Hilbert Tensor
10. The Gauge Principle and Uniqueness of RTG Lagrangian
11. A Generalization of RTG Systems of Equations
12. Solution of RTG Equations
12.1 The field of a spherically symmetric object
12.2 The exterior axisymmetric solution for a spinning mass
13. Gravitational Collapse
14. The Gravitational Field of a Nonstatic Spherically Symmetric Object in RTG. Birkhoff's Theorem
15. Gravitational Waves
16. A Homogeneous Isotropic Universe
17. Post-Newtonian Approximation in RTG
18. RTG and Solar System Gravitational Experiments. Ambiguities in the prediction of GR
19. Post-Newtonian integrals of motion in RTG
20. Do extended objects move along geodesics in the Riemann Space-Time?
21. The Peter-Mathews coefficient in RTG
Appendix 1
Appendix 2
Appendix 3
Appendix 4
Appendix 5
References
Name Index
Subjex Index