Riemannian Penrose inequality without horizon in dimension three

Abstract

Based on the μ-bubble method we are able to prove the following version of Riemannian Penrose inequality without horizon: if g is a complete metric on R3\O\ with nonnegative scalar curvature, which is asymptotically flat around the infinity of R3, then the ADM mass m at the infinity of R3 satisfies m≥ Ag16π, where Ag is denoted to be the area infimum of embedded closed surfaces homologous to S2(1) in R3\O\. Moreover, the equality holds if and only if there is a strictly outer-minimizing minimal 2-sphere such that the region outside is isometric to the half Schwarzschild manifold with mass Ag16π.