Scalar curvature and singular metrics

Abstract

Let Mn, n3, be a compact differentiable manifold with nonpositive Yamabe invariant σ(M). Suppose g0 is a continuous metric with V(M, g0)=1, smooth outside a compact set , and is in W1,ploc for some p>n. Suppose the scalar curvature of g0 is at least σ(M) outside . We prove that g0 is Einstein outside if the codimension of is at least 2. If in addition, g0 is Lipschitz then g0 is smooth and Einstein after a change the smooth structure. If is a compact embedded hypersurface, and g0 is smooth up to from two sides of , and if the difference of the mean curvatures along at two sides of has a fixed appropriate sign. Then g0 is also Einstein outside . For manifolds with dimension between 3 and 7 without spin assumption, we obtain a positive mass theorem on an asymptotically flat manifold for metrics with a compact singular set of codimension at least 2.