Publication: On generalized robertson-walker spacetimes satisfying some curvature condition
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Authors
Arslan, Kadri
Ezentaş, Rıdvan
Murathan, Cengizhan
Authors
Deszcz, Ryszard
Hotloś, Marian
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TÜBİTAK
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Abstract
We give necessary and sufficient conditions for warped product manifolds (M, g), of dimension >= 4, with 1-dimensional base, and in particular, for generalized Robertson-Walker spacetimes, to satisfy some generalized Einstein metric condition. Namely, the difference tensor R.C-C.R, formed from the curvature tensor R and the Weyl conformal curvature tensor C, is expressed by the Tachibana tensor Q(S,R) formed from the Ricci tensor S and R. We also construct suitable examples of such manifolds. They are quasi-Einstein, i.e. at every point of M rank (S - alpha g) <= 1, for some alpha is an element of R, or non-quasi-Einstein.
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Keywords
Warped product, Generalized Robertson-Walker spacetime, Einstein manifold, Quasi-Einstein manifold, Essentially conformally symmetric manifold, Tachibana tensor, Generalized Einstein metric condition, Pseudosymmetry type curvature condition, Ricci-pseudosymmetric hypersurface, Hypersurfaces, Geometry, Mathematics
Citation
Arslan, K. vd. (2014). "On generalized robertson-walker spacetimes satisfying some curvature condition". Turkish Journal of Mathematics, 38(2), 353-373.