Rendiconti della Scuola internazionale di fisica "Enrico Fermi."Academic Press, 1979 - Nuclear physics |
Contents
Introduction | 1 |
Isolated systems Boundary conditions asymptotics | 5 |
B G SCHMIDT | 11 |
Singular perturbations | 21 |
11 | 40 |
WALKER | 48 |
Definitions of energymomentum and angular momentum | 55 |
Introduction pag | 63 |
DEATH Perturbation methods for interactions between | 249 |
Interactions between a selfgravitating body and its sur | 257 |
Dynamics of two slowlymoving black holes | 268 |
Gravitational radiation from highspeed blackhole encounters | 280 |
ANDERSON Approximation methods in general relativity | 289 |
R BEIGA solvable model for radiation damping | 307 |
A ROSENBLUM Gravitational energy loss in scattering prob | 313 |
Introduction | 322 |
Dipoles Hertz potentials and the transmission of radiation | 70 |
WALKER Remarks on Trautmans radiation condition | 89 |
Radiation damping | 117 |
Generalrelativistic laws and equations of motion | 118 |
Applications alternatives conclusions | 138 |
W G DIXON Extended bodies in general relativity their | 156 |
Some mathematical techniques | 166 |
Description of extended bodies | 179 |
Conjectures on unsolved problems | 189 |
The test body approximation | 196 |
Rigid bodies in general relativity | 204 |
Discussion and outlook | 212 |
pag | 220 |
Gauge invariance and conservation laws | 235 |
Critique | 242 |
The Hamiltonian structure of geometrodynamics | 328 |
The constraint manifold | 343 |
The linearized Einstein system | 352 |
Linearization stability of the vacuum Einstein equations | 362 |
Decomposition of tensors | 374 |
Reduction of phase space and the symplectic space of gravi | 380 |
APPENDIX I Variational derivatives of the scalar curvature | 387 |
Y CHOQUETBRUHAT A E FISCHER and J E MARSDEN | 393 |
Weighted Sobolev and Hölder spaces | 401 |
The existence of maximal hypersurfaces | 407 |
The mass function as the generator of time translation | 451 |
H MÜLLER ZUM HAGEN and H J SEIFERT The characteristic | 457 |
The quasilinear case | 472 |
Copyright | |