Classification of Cylindrically Symmetric Static Spacetimes According to Their Ricci Collineations |
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Authors: | Asghar Qadir K. Saifullah M. Ziad |
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Affiliation: | (1) Department of Mathematics, Quaid-i-Azam University, Islamabad, Pakistan;(2) Department of Mathematical Sciences, King Fahd University of Petroleum and Minerals, Dhahran, Saudi Arabia |
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Abstract: | A complete classification of cylindrically symmetric static Lorentzian manifolds according to their Ricci collineations (RCs) is provided. The Lie algebras of RCs for the non-degenerate Ricci tensor have dimensions 3 to 10, excluding 8 and 9. For the degenerate tensor the algebra is mostly but not always infinite dimensional; there are cases of 10-, 5-, 4- and 3-dimensional algebras. The RCs are compared with the Killing vectors (KVs) and homothetic motions (HMs). The (non-linear) constraints corresponding to the Lie algebras are solved to construct examples which include some exact solutions admitting proper RCs. Their physical interpretation is given. The classification of plane symmetric static spacetimes emerges as a special case of this classification when the cylinder is unfolded. |
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Keywords: | Ricci collineation cylindrical symmetry |
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