Metric of a Rotating, Charged Mass

@article{Newman1965MetricOA,
  title={Metric of a Rotating, Charged Mass},
  author={Ezra Newman and W. E. Couch and K. Chinnapared and Albert Richard Exton and A. Prakash and Robert James Torrence},
  journal={Journal of Mathematical Physics},
  year={1965},
  volume={6},
  pages={918-919}
}
A new solution of the Einstein‐Maxwell equations is presented. This solution has certain characteristics that correspond to a rotating ring of mass and charge. 
Exact solution of the Einstein-Maxwell equations referring to a charged spinning mass
The full metric representing a charged generalization of the Gutsunaev-Manko stationary vacuum solution is given in the explicit form.
Generalization of the Kerr-Newman solution
An exact four-parameter solution of the Einstein-Maxwell equations is derived. This solution constitutes a generalization of the Kerr-Newman metric. It incorporates a quadrupole deformation of a
New axially symmetric solutions of the Einstein-Maxwell equations
New exact solutions of the algebraic form for the static Einstein-Maxwell equations representing the exterior gravitational field of a massive magnetic dipole are derived. They are then used for
Symmetry of charged rotating body metrics
The maximal local symmetry associated with the exterior metric of a charged rotating object, relating distinct solutions of the field equations, is proved to be eight-parametric. The finite
Spinning Mass Endowed with Electric Charge and Magnetic Dipole Moment
Exact asymptotically flat four-parameter solutions of the Einstein-Maxwell equations able to describe the exterior gravitational field of a rotating star possessing an electric charge and magnetic
Metric of a rotating charged magnetized sphere
Solutions of the Einstein and Einstein‐Maxwell Equations
Algebraically degenerate solutions of the Einstein and Einstein‐Maxwell equations are studied. Explicit solutions are obtained which contain two arbitrary functions of a complex variable, one
...
...

References

SHOWING 1-3 OF 3 REFERENCES
Note on the Kerr Spinning‐Particle Metric
It is shown that by means of a complex coordinate transformation performed on the monopole or Schwarzschild metric one obtains a new metric (first discovered by Kerr). It has been suggested that this
Structure of Gravitational Sources
The purpose of this paper is to propose a definition of multipole structure of gravitational sources in terms of the characteristic initial data for asymptotic solutions of the field equations. This