The positive mass theorem for non-spin manifolds with distributional curvature

Abstract

We prove the positive mass theorem for manifolds with distributional curvature which have been studied in Lee2015 without spin condition. In our case, the manifold M has asymptotically flat metric g∈ C0 W1,p-q, p>n, q>n-22. We show that the generalized ADM mass mADM(M,g) is non-negative as long as q=n-2, and g has non-negative distributional scalar curvature, bounded curvature in the Alexandrov sense with its distributional Ricci curvature belonging to certain weighted Lebesgue space and some extra conditions.