Warped product manifolds with p-dimensional base, p=1,2, satisfy some
curvature conditions of pseudosymmetry type. These conditions are formed from
the metric tensor g, the Riemann-Christoffel curvature tensor R, the Ricci
tensor S and the Weyl conformal curvature C of the considered manifolds. The
main result of the paper states that if p=2 and the fibre is a semi-Riemannian
space of constant curvature, if n is greater or equal to 4, then the
(0,6)-tensors R.R - Q(S,R) and C.C of such warped products are proportional to
the (0,6)-tensor Q(g,C) and the tensor C is expressed by a linear combination
of some Kulkarni-Nomizu products formed from the tensors g and S. Thus these
curvature conditions satisfy non-conformally flat non-Einstein warped product
spacetimes (p=2, n=4). We also investigate curvature properties of
pseudosymmetry type of quasi-Einstein manifolds. In particular, we obtain some
curvature property of the Goedel spacetime
The difference tensor R • C − C • R of a semi-Riemannian manifold (M, g), dim M ≥ 4, formed by its Riemann-Christoffel curvature tensor R and the Weyl conformal curvature tensor C, under some assumptions, can be expressed as a linear combination of (0, 6)-Tachibana tensors Q(A, T ), where A is a symmetric (0, 2)-tensor and T a generalized curvature tensor. These conditions form a family of generalized Einstein metric conditions. In this survey paper we present recent results on manifolds and submanifolds, and in particular hypersurfaces, satisfying such conditions. 1
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