A homogeneous Hilbert problem for the Kinnersley–Chitre transformations of electrovac space-times
- 1 June 1980
- journal article
- Published by AIP Publishing in Journal of Mathematical Physics
- Vol. 21 (6), 1418-1422
- https://doi.org/10.1063/1.524567
Abstract
The homogeneous Hilbert problem which we recently formulated for Kinnersley–Chitre transformations of vacuum spacetimes is here generalized to handle transformations of electrovac spacetimes. This provides in particular a simple derivation of our previously published integral equation.Keywords
This publication has 12 references indexed in Scilit:
- A homogeneous Hilbert problem for the Kinnersley–Chitre transformationsJournal of Mathematical Physics, 1980
- Integral equation method for effecting Kinnersley-Chitre transformations. IIPhysical Review D, 1979
- Integral equation method for effecting Kinnersley-Chitre transformationsPhysical Review D, 1979
- Symmetries of the stationary Einstein–Maxwell equations. IV. Transformations which preserve asymptotic flatnessJournal of Mathematical Physics, 1978
- Symmetries of the stationary Einstein–Maxwell field equations. IIIJournal of Mathematical Physics, 1978
- On the generation of new solutions of the Einstein–Maxwell field equations from electrovac spacetimes with isometriesJournal of Mathematical Physics, 1978
- Symmetries of the stationary Einstein–Maxwell field equations. IIJournal of Mathematical Physics, 1977
- Symmetries of the stationary Einstein–Maxwell field equations. IJournal of Mathematical Physics, 1977
- Rotating, charged, and uniformly accelerating mass in general relativityAnnals of Physics, 1976
- A Method for Generating Solutions of Einstein's EquationsJournal of Mathematical Physics, 1971