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Perfect fluid spacetimes and Yamabe solitons

Uday Chand De, Sudhakar Kumar Chaubey, Sameh Shenawy

2021Journal of Mathematical Physics68 citationsDOI

Abstract

This paper deals with the study of perfect fluid spacetimes. It is proven that a perfect fluid spacetime is Ricci recurrent if and only if the velocity vector field of perfect fluid spacetime is parallel and α = β. In addition, in a stiff matter perfect fluid Yang pure space with p + σ ≠ 0, the integral curves generated by the velocity vector field are geodesics. Moreover, it is shown that in a generalized Robertson–Walker perfect fluid spacetime, the Weyl tensor is divergence-free and the gradient of the potential function of the concircular vector field is pointwise collinear with the velocity vector field of perfect fluid spacetime. We also characterize the perfect fluid spacetimes whose Lorentzian metrics are Yamabe and gradient Yamabe solitons, respectively.

Topics & Concepts

Perfect fluidVector fieldKilling vector fieldSpacetimeGeodesicPhysicsPointwiseMathematical physicsYamabe flowField (mathematics)Mathematical analysisClassical mechanicsMathematicsPure mathematicsGeometryScalar curvatureQuantum mechanicsCurvatureMechanicsSectional curvatureBlack Holes and Theoretical PhysicsGeometric Analysis and Curvature FlowsCosmology and Gravitation Theories
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