On a type of Static Equation on Certain Contact Metric Manifolds

Abstract

This paper deals with the investigation of K-contact and (,μ)-contact manifolds admitting a positive smooth function f satisfying the equation: fRic=∇2f where Ric, ∇2f are traceless Ricci tensor and Hessian tensor respectively. We proved that if a complete and simply connected K-contact manifold admits such a smooth function f, then it is isometric to the unit sphere S2n+1. Next, we showed that if a non-Sasakian (,μ)-contact metric manifold admit such a smooth function f, then it is locally flat for n=1 and for n>1 is locally isometric to the product space En+1× Sn(4).

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