Conformal gradient vector fields on Riemannian manifolds with boundary

Abstract

Let (Mn,g) be an n-dimensional compact connected Riemannian manifold with smooth boundary. We show that the presence of a nontrivial conformal gradient vector field on M, with an appropriate control on the Ricci curvature makes M to be isometric to a hemisphere of Sn. We also prove that if an Einstein manifold admits nonzero conformal gradient vector field, then its scalar curvature is positive and it is isometric to a hemisphere of Sn. Furthermore, we prove that if M admits a nontrivial conformal vector field and has constant scalar curvature, then the scalar curvature is positive. Finally, a suitable control on the energy of a conformal vector field implies that M is isometric to a hemisphere Sn+.