Some rigidity results related to the Obata type equation

Abstract

Let (n+1,g) be an (n + 1)-dimensional smooth complete connected Riemannian manifold with compact boundary ∂= and f a smooth function on which satisfies the Obata type equation ∇2 f -fg =0 with Robin boundary condition f = cf, where c=θ>1. In this paper, we provide some rigidity results based on the warped product structure of determined by the equation ∇2 f -fg =0 and appropriate curvature assumptions. We also apply a similar method to the Obata type equation ∇2 f +fg =0 and get a rigidity result on the standard sphere Sn+1.

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