Colliding gravitational plane waves with noncollinear polarization. II
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Publication:3805194
DOI10.1063/1.527698zbMath0657.35117OpenAlexW4234991680MaRDI QIDQ3805194
F. J. Ernst, Alberto García D., Isidore Hauser
Publication date: 1987
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1063/1.527698
Geroch groupcolliding gravitational plane wavesKramer-Neugebauer involutionnoncollinear polarizationvacuum Einstein solutions
Partial differential equations of mathematical physics and other areas of application (35Q99) Geometric theory, characteristics, transformations in context of PDEs (35A30)
Related Items (9)
Initial value problem for colliding gravitational plane waves. IV ⋮ Nonimpulsive colliding gravitational waves with noncollinear polarizations ⋮ Initial value problem for colliding gravitational plane waves. I ⋮ Role of the initial conditions in the occurrence of singularity at collision of plane gravitational waves with collinear polarization ⋮ The S̄(a,b,c/m) metrics interpreted as colliding wave solutions ⋮ A class of colliding waves in metric-affine gravity, nonmetricity and torsion shock waves ⋮ Colliding wave solutions of the Einstein–Maxwell field equations ⋮ Colliding plane waves in terms of Jacobi functions ⋮ Colliding gravitational plane waves with noncollinear polarization. III
Cites Work
- On the collision of gravitational plane waves: A class of soliton solutions
- New Series of Exact Solutions for Gravitational Fields of Spinning Masses
- A new type of singularity created by colliding gravitational waves
- On the Nutku—Halil solution for colliding impulsive gravitational waves
- The initial value problem for colliding gravitational and hydrodynamic waves
- Colliding gravitational plane waves with noncollinear polarization. I
- Proof of a Geroch conjecture
- Topology of Some Spheroidal Metrics
- A Method for Generating New Solutions of Einstein's Equation. II
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