Total mean curvatures of Riemannian hypersurfaces

Abstract

We obtain a comparison formula for integrals of mean curvatures of Riemannian hypersurfaces, via Reilly's identities. As applications we derive several geometric inequalities for a convex hypersurface in a Cartan-Hadamard manifold M. In particular we show that the first mean curvature integral of a convex hypersurface γ nested inside cannot exceed that of , which leads to a sharp lower bound in dimension 3 for the total first mean curvature of in terms of the volume it bounds in M. This monotonicity property is extended to all mean curvature integrals when γ is parallel to , or M has constant curvature. We also characterize hyperbolic balls as minimizers of the mean curvature integrals among balls with equal radii in Cartan-Hadamard manifolds.