Curvatures in contravariant warped product space
Abstract
In this article, we introduce the sectional curvature in contravariant warped product space (M= M1×f1M2,,gf1), where =1+12). After that we find the sectional curvature of M for which M1 and M2 are Poisson manifolds of positive sectional curvatures. In dual space of M, we introduce the notion of null, spacelike, timelike 1 - forms and then by using these forms, qualar curvature is defined. Finally, as an examples we obtain the sectional curvatures for M1 = H12, M2 = S02 , E22 and qualar curvature for M.
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