Weyl−Lewis−Papapetrou coordinates

G_{\mu \nu }+\Lambda g_{\mu \nu }={8\pi G \over c^{4}}T_{\mu \nu }

Fundamental concepts

Phenomena

Spacetime
Kepler problem Gravitational lensing Gravitational waves Frame-dragging Geodetic effect Event horizon Singularity Black hole
Spacetime diagrams Minkowski spacetime Einstein–Rosen bridge

Equations
Formalisms

Equations
Linearized gravity Einstein field equations Friedmann Geodesics Mathisson–Papapetrou–Dixon Hamilton–Jacobi–Einstein
Formalisms
ADM BSSN Post-Newtonian
Advanced theory
Kaluza–Klein theory Quantum gravity

Solutions

Scientists

In general relativity, the Weyl−Lewis−Papapetrou coordinates are a set of coordinates, used in the solutions to the vacuum region surrounding an axisymmetric distribution of mass–energy. They are named for Hermann Weyl, T. Lewis, and Achilles Papapetrou.

The square of the line element is of the form:^[1]

ds^{2}=-e^{{2\nu }}dt^{2}+\rho ^{2}B^{2}e^{{-2\nu }}(d\phi -\omega dt)^{2}+e^{{2(\lambda -\nu )}}(d\rho ^{2}+dz^{2})

where (t, ρ, ϕ, z) are the cylindrical Weyl−Lewis−Papapetrou coordinates in 3 + 1 spacetime, and λ, ν, ω, and B, are unknown functions of the spatial non-angular coordinates ρ and z only. Different authors define the functions of the coordinates differently.

References

↑ Jiří Bičák; O. Semerák; Jiří Podolský; Martin Žofka (2002). Gravitation, Following the Prague Inspiration: A Volume in Celebration of the 60th Birthday of Jiří Bičák. World Scientific. p. 122. ISBN 981-238-093-0.

Selected papers

J. Marek; A. Sloane (1979). "A finite rotating body in general relativity". Il Nuovo Cimento B Series 11. 51 (1). pp. 45–52.
L. Richterek; J. Novotny; J. Horsky (2002). "Einstein−Maxwell fields generated from the gamma-metric and their limits" (PDF). Czech.J.Phys. 52. p. 2. arXiv:gr-qc/0209094v1. doi:10.1023/A:1020581415399.
M. Sharif (2007). "Energy-Momentum Distribution of the Weyl−Lewis−Papapetrou and the Levi-Civita Metrics" (PDF). Brazilian Journal of Physics. 37.
A. Sloane (1978). "The axially symmetric stationary vacuum field equations in Einstein's theory of general relativity". Aust. J. Phys. 31. CSIRO. p. 429. Bibcode:1978AuJPh..31..427S.

Selected books

J. L. Friedman; N. Stergioulas (2013). Rotating Relativistic Stars. Cambridge Monographs on Mathematical Physics. Cambridge University Press. p. 151. ISBN 052-187-254-5.
A. Macías; J. L. Cervantes-Cota; C. Lämmerzahl (2001). Exact Solutions and Scalar Fields in Gravity: Recent Developments. Springer. p. 39. ISBN 030-646-618-X.
A. Das; A. DeBenedictis (2012). The General Theory of Relativity: A Mathematical Exposition. Springer. p. 317. ISBN 146-143-658-3.
G. S. Hall; J. R. Pulham (1996). General relativity: proceedings of the forty sixth Scottish Universities summer school in physics, Aberdeen, July 1995. SUSSP proceedings. 46. Scottish Universities Summer School in Physics. pp. 65, 73, 78. ISBN 075-030-395-6.

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Weyl−Lewis−Papapetrou coordinates

See also

References

Selected papers

Selected books