Conformal vector fields in general relativity
- 1 July 1991
- journal article
- Published by AIP Publishing in Journal of Mathematical Physics
- Vol. 32 (7) , 1847-1853
- https://doi.org/10.1063/1.529249
Abstract
A general discussion of conformal vector fields in space‐times is given. Amongst the topics considered are the maximum dimension of the conformal algebra for space‐times that are not conformally flat, the nature of conformal isotropies and a new approach to the theorem of Bilyalov and Defrise‐Carter concerning the reduction of the conformal algebra to a Killing or homothetic algebra. Some deficiencies in the original statements of this theorem are discussed (with reference to a general class of counterexamples) and corrected. The proof offered is geometrical in nature and has the advantage of displaying some of the more general features and properties of conformal vector fields and the ways in which they can differ from Killing vector fields.Keywords
This publication has 11 references indexed in Scilit:
- Conformal symmetries and fixed points in space-timeJournal of Mathematical Physics, 1990
- Special conformal symmetries in general relativityGeneral Relativity and Gravitation, 1990
- Local and global algebraic structures in general relativityInternational Journal of Theoretical Physics, 1989
- Homothetic transformations with fixed points in spacetimeGeneral Relativity and Gravitation, 1988
- Selfsimilar Lorentzian manifoldsAnnals of Global Analysis and Geometry, 1985
- On space-times admitting a three-parameter isometry group with two-dimensional null orbitsJournal of Physics A: General Physics, 1979
- Invariants of real low dimension Lie algebrasJournal of Mathematical Physics, 1976
- Conformal groups and conformally equivalent isometry groupsCommunications in Mathematical Physics, 1975
- Orbits of families of vector fields and integrability of distributionsTransactions of the American Mathematical Society, 1973
- Limits of spacetimesCommunications in Mathematical Physics, 1969