The quasi-normal modes of the Schwarzschild black hole
- 12 August 1975
- journal article
- Published by The Royal Society in Proceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences
- Vol. 344 (1639) , 441-452
- https://doi.org/10.1098/rspa.1975.0112
Abstract
The quasi-normal modes of a black hole represent solutions of the relevant perturbation equations which satisfy the boundary conditions appropriate for purely outgoing (gravitational) waves at infinity and purely ingoing waves at the horizon. For the Schwarzschild black hole the problem reduces to one of finding such solutions for a one-dimensional wave equation (Zerilli’s equation) for a potential which is positive everywhere and is of short-range. The notion of quasi-normal modes of such one-dimensional potential barriers is examined with two illustrative examples; and numerical solutions for Zerilli’s potential are obtained by integrating the associated Riccati equation.Keywords
This publication has 7 references indexed in Scilit:
- On the equations governing the perturbations of the Schwarzschild black holeProceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences, 1975
- A variational calculation of the fundamental frequencies of quadrupole pulsation of fluid spheres in general relativityThe Astrophysical Journal, 1975
- Nonspherical Perturbations of Relativistic Gravitational Collapse. II. Integer-Spin, Zero-Rest-Mass FieldsPhysical Review D, 1972
- Nonspherical Perturbations of Relativistic Gravitational Collapse. I. Scalar and Gravitational PerturbationsPhysical Review D, 1972
- Gravitational Field of a Particle Falling in a Schwarzschild Geometry Analyzed in Tensor HarmonicsPhysical Review D, 1970
- The Dynamical Instability of Gaseous Masses Approaching the Schwarzschild Limit in General Relativity.The Astrophysical Journal, 1964
- Stability of a Schwarzschild SingularityPhysical Review B, 1957