All vacuum Bianchi I metrics with a homothety
Open Access
- 1 June 1991
- journal article
- Published by IOP Publishing in Classical and Quantum Gravity
- Vol. 8 (6) , 1173-1184
- https://doi.org/10.1088/0264-9381/8/6/014
Abstract
All vacuum metrics with a four-parameter homothety group containing a three-dimensional Abelian subgroup are found. These include the Kasner family of metrics, metrics related to the Kasner family by complex transformations (which include a family of vacuum metrics found by Lewis in 1932 and a metric found by Petrov in 1962 to be the only vacuum metric which admits a simply-transitive four-parameter isometry group), together with algebraically degenerate van Stockum, pp-wave and plane-wave metrics. Apart from the plane-wave metric, all the other metrics are written here as one general family.Keywords
This publication has 9 references indexed in Scilit:
- Homothety groups in space-timeGeneral Relativity and Gravitation, 1990
- Homothetic transformations with fixed points in spacetimeGeneral Relativity and Gravitation, 1988
- Complex relativity and real solutions. I: IntroductionGeneral Relativity and Gravitation, 1985
- Symmetries of the nontwisting type-N solutions with cosmological constantJournal of Mathematical Physics, 1983
- On homogeneous solutions of Einstein's field equationsGeneral Relativity and Gravitation, 1978
- Conformal groups and conformally equivalent isometry groupsCommunications in Mathematical Physics, 1975
- IX.—The Gravitational Field of a Distribution of Particles Rotating about an Axis of SymmetryProceedings of the Royal Society of Edinburgh, 1938
- Some special solutions of the equations of axially symmetric gravitational fieldsProceedings of the Royal Society of London. Series A, Containing Papers of a Mathematical and Physical Character, 1932
- Geometrical Theorems on Einstein's Cosmological EquationsAmerican Journal of Mathematics, 1921