Bound Geodesics in the Kerr Metric
- 15 February 1972
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review D
- Vol. 5 (4) , 814-822
- https://doi.org/10.1103/physrevd.5.814
Abstract
The bound geodesics (orbits) of a particle in the Kerr metric are examined. (By "bound" we signify that the particle ranges over a finite interval of radius, neither being captured by the black hole nor escaping to infinity.) All orbits either remain in the equatorial plane or cross it repeatedly. A point where a nonequatorial orbit intersects the equatorial plane is called a node. The nodes of a spherical (i.e., constant radius) orbit are dragged in the sense of the spin of the black hole. A spherical orbit near the one-way membrane traces out a helix-like path lying on a sphere enclosing the black hole.Keywords
This publication has 4 references indexed in Scilit:
- Reversible Transformations of a Charged Black HolePhysical Review D, 1971
- Reversible and Irreversible Transformations in Black-Hole PhysicsPhysical Review Letters, 1970
- Global Structure of the Kerr Family of Gravitational FieldsPhysical Review B, 1968
- The gravity field of a particle. IIProceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences, 1961