Smoothing L∞ Riemannian metrics with nonnegative scalar curvature outside of a singular set

Abstract

We show that any L∞ Riemannian metric g on Rn that is smooth with nonnegative scalar curvature away from a singular set of finite (n-α)-dimensional Minkowski content, for some α>2, admits an approximation by smooth Riemannian metrics with nonnegative scalar curvature, provided that g is sufficiently close in L∞ to the Euclidean metric. The approximation is given by time slices of the Ricci-DeTurck flow, which converge locally in C∞ to g away from the singular set. We also identify conditions under which a smooth Ricci-DeTurck flow starting from a L∞ metric that is uniformly bilipschitz to Euclidean space and smooth with nonnegative scalar curvature away from a finite set of points must have nonnegative scalar curvature for positive times.