Removable singularity of positive mass theorem with continuous metrics

Abstract

In this paper, we consider asymptotically flat Riemannnian manifolds (Mn,g) with C0 metric g and g is smooth away from a closed bounded subset and the scalar curvature Rg 0 on M . For given n p ∞, if g∈ C0 W1,p and the Hausdorff measure Hn-pp-1()<∞ when n p<∞ or Hn-1()=0 when p=∞, then we prove that the ADM mass of each end is nonnegative. Furthermore, if the ADM mass of some end is zero, then we prove that (Mn,g) is isometric to the Euclidean space by showing the manifold has nonnegative Ricci curvature in RCD sense. This extends the result of [Lee-LeFloch2015] from spin to non-spin, also improves the result of [Shi-Tam2018] and [Lee2013]. Moreover, for p=∞, this confirms a conjecture of Lee [Lee2013].