Comprehensive quasi-Einstein spacetime with application to general relativity

Abstract

The aim of this paper is to extend the notion of all known quasi-Einstein manifolds like generalized quasi-Einstein, mixed generalized quasi-Einstein manifold, pseudo generalized quasi-Einstein manifold and many more and name it comprehensive quasi Einstein manifold C(QE)n. We investigate some geometric and physical properties of the comprehensive quasi Einstein manifolds C(QE)n under certain conditions. We study the conformal and conharmonic mappings between C(QE)n manifolds. Then we examine the C(QE)n with harmonic Weyl tensor. We investigate geometric and physical properties of the comprehensive quasi Einstein manifolds C(QE)n under certain conditions. We define the manifold of comprehensive quasi-constant curvature and proved that conformally flat C(QE)n is manifold of comprehensive quasi-constant curvature and vice versa. We study the general two viscous fluid spacetime C(QE)4 and find out some important consequences about C(QE)4. We study C(QE)n with vanishing space matter tensor. Finally, we prove the existence of such manifolds by constructing non-trivial example.