On the Lr-operators penalized by (r+1)-mean curvature

Abstract

In this paper, we establish the non-positivity of the second eigenvalue of the Schr\"odinger operator -div( Pr ∇·) - Wr2 on a closed hypersurface n of Rn+1, where Wr is a power of the (r+1)-th mean curvature of n. In the case that this eigenvalue is null we have a characterization of the sphere. This generalizes a result of Evans and Loss proved for the Laplace-Beltrame operator penalized by the square of the mean curvature.