Abstract
Charged perfect fluid with vanishing Lorentz force and massless scalar field is studied for the case of stationary cylindrically symmetric spacetime. The scalar field can depend both on radial and longitudinal coordinates. Solutions are found and classified according to scalar field gradient and magnetic field relationship. Their physical and geometrical properties are examined and discussion of particular cases, directly generalizing Gödel-type spacetimes, is presented.
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References
K. Gödel: Rev. Mod. Phys.21 (1949) 447.
J.P. Wright: J. Math. Phys.6 (1965) 103.
A. Banerjee and S. Banerji: J. Phys. A1 (1968) 188.
M.M. Som and A.K. Raychaudhuri: Proc. R. Soc. A304 (1968) 81.
D. Kramer, H. Stephani, M.A.H. MacCallum, and E. Hertl:Exact solutions of Einstein’s field equations, VEB DAW, Berlin, 1980.
W.B. Bonnor: J. Phys. A. Math. Gen.13 (1980) 3465.
N.V. Mitskievič and G.A. Tsalakou: Class. Quantum Grav.8 (1991) 209.
J. Horský and N.V. Mitskievič: Czech. J. Phys. B39 (1989) 957.
A.M. Upornikov: Class. Quantum Grav.11 (1994) 2085.
N.V. Mitskievich: inExact Solutions and Scalar Fields in Qravity: Recent Developments (Eds. A. Macias, J. Cervantes, and C. Laemmerzahl), Kluwer Academic/Plenum Publisher, New York, 2001.
P. Klepáč and J. Horský: Class. Quantum Grav.17 (2000) 2547.
J.D. Barrow and M.P. Dabrowski: Phys. Rev. D58 (1998) 103502.
P. Kanti and C.E. Vayonakis: Phys. Rev. D60 (1999) 103519.
M.J. Rebouças and J. Tiomno: Phys. Rev. D28 (1983) 1251.
P.R.C.T. Pereira, N.O. Santos, and A.Z. Wang: Class. Quantum Grav.13 (1996) 1641.
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Klepáč, P., Horský, J. Charged perfect fluid and scalar field coupled to gravity. Czech J Phys 51, 1177–1187 (2001). https://doi.org/10.1023/A:1012862912259
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DOI: https://doi.org/10.1023/A:1012862912259