Scalar curvature rigidity of spheres with subsets removed and L∞ metrics

Abstract

We prove the scalar curvature rigidity for L∞ metrics on SnΣ, where Sn is the n-dimensional sphere with n≥ 3 and Σ is a closed subset of Sn of codimension at least n2+1 that satisfies the wrapping property. The notion of wrapping property was introduced by the second author for studying related scalar curvature rigidity problems on spheres. For example, any closed subset of Sn contained in a hemisphere and any finite subset of Sn satisfy the wrapping property. The same techniques also apply to prove an analogous scalar rigidity result for L∞ metrics on tori that are smooth away from certain subsets of codimension at least n2+1. As a corollary, we obtain a positive mass theorem for complete asymptotically flat spin manifolds with arbitrary ends for L∞ metrics.