Litcius/Paper detail

Geometry of almost contact metrics as an almost ∗-η-Ricci–Bourguignon solitons

Santu Dey, Young Jin Suh

2023Reviews in Mathematical Physics11 citationsDOI

Abstract

In this paper, we give some characterizations by considering almost ∗-[Formula: see text]-Ricci–Bourguignon soliton as a Kenmotsu metric. It is shown that if a Kenmotsu metric endows a ∗-[Formula: see text]-Ricci–Bourguignon soliton, then the curvature tensor R with the soliton vector field V is given by the expression [Formula: see text] Next, we show that if an almost Kenmotsu manifold such that [Formula: see text] belongs to [Formula: see text]-nullity distribution where [Formula: see text] acknowledges a ∗-[Formula: see text]-Ricci–Bourguignon soliton satisfying [Formula: see text], then the manifold is Ricci-flat and is locally isometric to [Formula: see text]. Moreover if the metric admits a gradient almost ∗-[Formula: see text]-Ricci–Bourguignon soliton and [Formula: see text] leaves the scalar curvature r invariant on a Kenmotsu manifold, then the manifold is an [Formula: see text]-Einstein. Also, if a Kenmotsu metric represents an almost ∗-[Formula: see text]-Ricci–Bourguignon soliton with potential vector field V is pointwise collinear with [Formula: see text], then the manifold is an [Formula: see text]-Einstein.

Topics & Concepts

Ricci curvatureScalar curvatureMathematicsEinstein manifoldManifold (fluid mechanics)PointwiseMathematical physicsRiemann curvature tensorEinsteinVector fieldCurvaturePure mathematicsMathematical analysisGeometryEngineeringMechanical engineeringGeometric Analysis and Curvature FlowsGeometry and complex manifoldsAdvanced Differential Geometry Research