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Yamabe solitons and gradient Yamabe solitons on three-dimensional N(k)-contact manifolds

Young Jin Suh, Uday Chand De

2020International Journal of Geometric Methods in Modern Physics19 citationsDOI

Abstract

If a three-dimensional [Formula: see text]-contact metric manifold [Formula: see text] admits a Yamabe soliton of type [Formula: see text], then the manifold has a constant scalar curvature and the flow vector field [Formula: see text] is Killing. Furthermore, either [Formula: see text] has a constant curvature [Formula: see text] or the flow vector field [Formula: see text] is a strict contact infinitesimal transformation. Also, we prove that if the metric of a three-dimensional [Formula: see text]-contact metric manifold [Formula: see text] admits a gradient Yamabe soliton, then either the manifold is flat or the scalar curvature is constant. Moreover, either the potential function is constant or the manifold is of constant sectional curvature [Formula: see text]. Finally, we have given an example to verify our result.

Topics & Concepts

Scalar curvatureManifold (fluid mechanics)MathematicsConstant (computer programming)Mathematical physicsVector fieldYamabe flowMathematical analysisCurvatureKilling vector fieldSolitonScalar fieldScalar (mathematics)PhysicsSectional curvatureGeometryQuantum mechanicsComputer scienceProgramming languageEngineeringMechanical engineeringNonlinear systemGeometric Analysis and Curvature FlowsGeometry and complex manifoldsGeometric and Algebraic Topology
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