Gravitational radiation from a particle in circular orbit around a black hole. V. Black-hole absorption and tail corrections

Abstract

A particle of mass μ moves on a circular orbit of a nonrotating black hole of mass M. Under the restrictions μ/M 1 and v 1, where v is the orbital velocity, we consider the gravitational waves emitted by such a binary system. We calculate E, the rate at which the gravitational waves remove energy from the system. The total energy loss is given by E = E∞ + EH, where E∞ denotes that part of the gravitational-wave energy which is carried off to infinity, while EH denotes the part which is absorbed by the black hole. We show that the black-hole absorption is a small effect: EH/E v8. We also compare the wave generation formalism which derives from perturbation theory to the post-Newtonian formalism of Blanchet and Damour. Among other things we consider the corrections to the asymptotic gravitational-wave field which are due to wave-propagation (tail) effects.

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