Separability of the Killing–Maxwell system underlying the generalized angular momentum constant in the Kerr–Newman black hole metrics
From MaRDI portal
Publication:3780074
DOI10.1063/1.527509zbMath0639.53069OpenAlexW2017614440MaRDI QIDQ3780074
No author found.
Publication date: 1987
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1063/1.527509
conservation lawelectromagnetic fieldangular momentumKilling-Yano tensorKilling-Maxwell systemMaxwell-type equation
Electromagnetic fields in general relativity and gravitational theory (83C50) Applications of local differential geometry to the sciences (53B50)
Related Items (9)
Black holes, hidden symmetries, and complete integrability ⋮ Separation of Maxwell equations in Kerr-NUT-(A)dS spacetimes ⋮ Higher-dimensional lifts of Killing–Yano forms with torsion ⋮ Separability and Killing tensors in Kerr-Taub-NUT-de Sitter metrics in higher dimensions ⋮ Charged Kerr-de Sitter black holes in five dimensions ⋮ f-SYMBOLS, KILLING TENSORS AND CONSERVED BEL-TYPE CURRENTS ⋮ Conformal Yano-Killing tensors in Einstein spacetimes ⋮ Motions in Taub-NUT-de Sitter spinning spacetime ⋮ The hidden symmetries of multi-centre metrics
Cites Work
- Riemannian-Maxwellian invertible structures in general relativity
- On the relationship between Killing tensors and Killing-Yano tensors
- On quadratic first integrals of the geodesic equations for type [22 spacetimes]
- Spacetimes with Killing tensors
- The symmetries of Kerr black holes
- Proof of uniqueness of the Kerr-Newman black hole solution
- Parallel-propagated frame along the geodesics of the metrics admitting a Killing–Yano tensor
- Gravitational Field of a Spinning Mass as an Example of Algebraically Special Metrics
- Almost-structures and structures in Lorentzian manifolds. I. Almost-Hermite- and almost-product- (2×2) -structures
- Space–times admitting Killing–Yano tensors. I
- Solution to the equations of parallel transport in Kerr geometry; tidal tensor
- Separation of variables and symmetry operators for the neutrino and Dirac equations in the space-times admitting a two-parameter abelian orthogonally transitive isometry group and a pair of shearfree geodesic null congruences
- Maximal Analytic Extension of the Kerr Metric
- Killing Horizons and Orthogonally Transitive Groups in Space-Time
- Global Structure of the Kerr Family of Gravitational Fields
- Type D Vacuum Metrics
This page was built for publication: Separability of the Killing–Maxwell system underlying the generalized angular momentum constant in the Kerr–Newman black hole metrics
