Geometry of almost contact metrics as almost *-Ricci solitons
Abstract
In the present paper, we give some characterizations by considering *-Ricci soliton as a Kenmotsu metric. We prove that if a Kenmotsu manifold represents an almost *-Ricci soliton with the potential vector field V is a Jacobi along the Reeb vector field, then it is a steady *-Ricci soliton. Next, we show that a Kenmotsu matric endowed an almost *-Ricci soliton is Einstein metric if it is η-Einstein or the potential vector field V is collinear to the Reeb vector field or V is an infinitesimal contact transformation.
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