Doubling of asymptotically flat half-spaces and the Riemannian Penrose inequality

Abstract

Building on previous works of H. L. Bray, of P. Miao, and of S. Almaraz, E. Barbosa, and L. L. de Lima, we develop a doubling procedure for asymptotically flat half-spaces (M,g) with horizon boundary ⊂ M and mass m∈R. If 3≤ (M)≤ 7, (M,g) has non-negative scalar curvature, and the boundary ∂ M is mean-convex, we obtain the Riemannian Penrose-type inequality m≥(12)nn-1\,(||ωn-1)n-2n-1 as a corollary. Moreover, in the case where ∂ M is not totally geodesic, we show how to construct local perturbations of (M,g) that increase the scalar curvature. As a consequence, we show that equality holds in the above inequality if and only if the exterior region of (M,g) is isometric to a Schwarzschild half-space. Previously, these results were only known in the case where (M)=3 and is a connected free boundary hypersurface.