On the Robinson theorem and shearfree geodesic null congruences
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Publication:1069477
DOI10.1007/BF00704584zbMath0584.53032MaRDI QIDQ1069477
Publication date: 1985
Published in: Letters in Mathematical Physics (Search for Journal in Brave)
Electromagnetic fields in general relativity and gravitational theory (83C50) Applications of local differential geometry to the sciences (53B50)
Related Items (14)
Pure spinors, intrinsic torsion and curvature in even dimensions ⋮ Null solutions of the Yang-Mills equations ⋮ An equation satisfied by the tangent to a shear-free, geodesic, null congruence ⋮ Symmetries of Cauchy-Riemann spaces ⋮ On the Fefferman class of metrics associated with a three-dimensional CR space ⋮ Optical geometries and related structures ⋮ On the existence of nonclassical symmetries of partial differential equations ⋮ 3-folds CR-embedded in 5-dimensional real hyperquadrics ⋮ Robinson manifolds as the Lorentzian analogs of Hermite manifolds. ⋮ Almost Robinson geometries ⋮ Null electromagnetic fields and relative Cauchy–Riemann embeddings ⋮ The geometry of marked contact Engel structures ⋮ Cartan's chains and Lorentz geometry ⋮ Twisting non-shearing congruences of null geodesics, almost CR structures and Einstein metrics in even dimensions
Cites Work
- On the local character of the solutions of an atypical linear differential equation in three variables and a related theorem for regular functions of two complex variables
- An example of a smooth linear partial differential equation without solution
- A conventional proof of Kerr's theorem
- Nowhere solvable homogeneous partial differential equations
- Conformal geometry of flows in n dimensions
- Twistor Algebra
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