• Corpus ID: 118504566

A Singularity-free Empty Universe

@article{Misner1969ASE,
  title={A Singularity-free Empty Universe},
  author={Charles W. Misner and A. H. Taub},
  journal={Journal of Experimental and Theoretical Physics},
  year={1969},
  volume={28},
  pages={122}
}
  • C. Misner, A. Taub
  • Published 1969
  • Mathematics
  • Journal of Experimental and Theoretical Physics
Einstein equations solution for empty space without singularities containing metric, with closed homogeneous space type hypersurfaces expanding anisotropically 
No Paper Link Available
38 Citations
Highly Influential Citations
3
Background Citations
15
Methods Citations
3

38 Citations

Citation Type

Citation Type

Stability of two-dimensional quasisingular space-times
We study the stability of a class of two-dimensional cylindrical space-times with quasiregular singularities using massless scalar waves. The fact that the stress-energy scalarTμvTμv diverges
Cylindrically Symmetric, Asymptotically Flat, Petrov Type D Spacetime with a Naked Curvature Singularity and Matter Collapse
We present a cylindrically symmetric, Petrov type D, nonexpanding, shear-free, and vorticity-free solution of Einstein’s field equations. The spacetime is asymptotically flat radially and regular
On null-geodesic completions of Lorentzian manifolds
We study the question of local and global uniqueness of completions, based on null geodesics, of Lorentzian manifolds. We show local uniqueness of such boundary extensions. We give a necessary and
INFILLING FOR NUT SPACE.
A method of generating interior NUT solutions from spherically symmetric ones is presented. It is similar to the well‐known ``derivation'' of the corresponding vacuum metric from the Schwarzschild
Conformal boundary extensions of Lorentzian manifolds
We study the question of local and global uniqueness of completions, based on null geodesics, of Lorentzian manifolds. We show local uniqueness of such boundary extensions. We give a necessary and
Ju n 20 06 Conformal boundary extensions of Lorentzian manifolds
We study the question of local and global uniqueness of completions, based on null geodesics, of Lorentzian manifolds. We show local uniqueness of such boundary extensions. We give a necessary and
Gowdy-symmetric cosmological models with Cauchy horizons ruled by non-closed null generators
Smooth Gowdy-symmetric generalized Taub-NUT solutions are a class of inhomogeneous cosmological models with spatial three-sphere topology. They have a past Cauchy horizon with closed null-generators,
The Hopf fibration—seven times in physics
On the NUT–Born–Infeld-Λ spacetime
Smooth Gowdy-symmetric generalised Taub–NUT solutions in Einstein–Maxwell theory
  • J. Hennig
  • Mathematics
    Classical and Quantum Gravity
  • 2019
We introduce a new class of inhomogeneous cosmological models as solutions to the Einstein-Maxwell equations in electrovacuum. The new models can be considered to be nonlinear perturbations, through
...
1
2
3
4
...