A Goldberg-Sachs theorem in dimension three

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Authors	NUROWSKI Pawel TAGHAVI-CHABERT Arman
Year of publication	2015
Type	Article in Periodical
Magazine / Source	Classical and Quantum Gravity
MU Faculty or unit	Faculty of Science
Citation
Doi	http://dx.doi.org/10.1088/0264-9381/32/11/115009
Field	General mathematics
Keywords	three-dimensional pseudo-Riemannian geometry; Goldberg-Sachs theorem; congruences of geodesics; algebraically special spacetimes; topological massive gravity
Description	We prove a Goldberg-Sachs theorem in dimension three. To be precise, given a three-dimensional Lorentzian manifold satisfying the topological massive gravity equations, we provide necessary and sufficient conditions on the trace-free Ricci tensor for the existence of a null line distribution whose orthogonal complement is integrable and totally geodetic. This includes, in particular, Kundt spacetimes that are solutions of the topological massive gravity equations.
Related projects:	Skoro izotropní struktury v pseudo-riemannovské geometrii