A volumetric Penrose inequality for conformally flat manifolds

Abstract

We consider asymptotically flat Riemannian manifolds with nonnegative scalar curvature that are conformal to n , n 3, and so that their boundary is a minimal hypersurface. (Here, ⊂ n is open bounded with smooth mean-convex boundary.) We prove that the ADM mass of any such manifold is bounded below by (V/βn)(n-2)/n, where V is the Euclidean volume of and βn is the volume of the Euclidean unit n-ball. This gives a partial proof to a conjecture of Bray and Iga brayiga. Surprisingly, we do not require the boundary to be outermost.