Abstract
The axisymmetric rigidly rotating or static perfect fluid solutions admitting a proper conformai Killing vector orthogonal to the orbits of the two-dimensional group of motions are determined.
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References
Ellis, G. F. R. (1967).J. Math. Phys.,8, 1171.
Wahlquist, H. (1968).Phys. Rev.,172, 1291.
Wainwright, J. (1970).Commun. Math. Phys.,17, 42.
Senovilla, J. M. M. (1987).Class. Quant. Grav.,4, L115.
Kramer, D. (1985).Class. Quant. Grav.,2, L135.
Senovilla, J. M. M. (1987).Phys. Lett.,A123, 211.
Herlt, E. (1988).Gen. Rel. Grav.,20, 635.
Herlt, E. (1972).Wiss. Z. Univ. Jena, Math.-Nat. R,21, 19.
Carter, B. (1968).Commun. Math. Phys.,10, 280.
Garcia Díaz, A., and Hauser, I. (1988).J. Math. Phys.,29, 175.
Dyer, C. C., McVittie, G. C., and Oattes, L. M. (1987).Gen. Rel. Grav.,19, 887.
Kramer, D. (1989). InProceedings of the 3rd Hungarian Relativity Workshop, Tihany 1989, (Nova Science Publishers), to appear.
Garcia Díaz, A. (1988).Gen. Rel. Grav.,20, 589.
Barnes, A. (1972).J. Phys. A.: Gen. Phys.,5, 374.
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Kramer, D. Perfect fluids with conformal motion. Gen Relat Gravit 22, 1157–1162 (1990). https://doi.org/10.1007/BF00759016
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DOI: https://doi.org/10.1007/BF00759016