Conformal Vector Fields and the De-Rham Laplacian on a Riemannian Manifold with Boundary
Abstract
Let (Mn,g) be an n-dimensional compact connected Riemannian manifold with boundary. In this article, we study the effects of the presence of a nontrivial conformal vector field on (Mn,g). We used the wekk-known de-Rham Laplace operator and a nontrivial solution of the famous Fischer-Marsden differential equation to provide two characterizations of the hemisphere Sn+(c) of constant curvature c>0. As a consequence of the characterization using the Fischer-Marsden equation, we prove the cosmic no-hair conjecture under a given integral condition.
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