On ()-para Sasakian 3-manifolds
Abstract
In this paper we study the 3-dimensional () -para Sasakian manifolds. We obtain an necessary and sufficient condition for an ( ) -para Sasakian 3 -manifold to be an indefinite space form. We show that a Ricci-semi-symmetric () -para Sasakian 3 -manifold is an indefinite space form. We investigate the necessary and sufficient condition for an () -para Sasakian 3 -manifold to be locally -symmetric. It is proved that in an () -para Sasakian 3-manifold with η -parallel Ricci tensor the scalar curvature is constant. It is also shown that every () -para Sasakian 3-manifolds is pseudosymmetric in the sense of R. Deszcz.
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