Ricci flow of W2,2-metrics in four dimensions

Abstract

In this paper we construct solutions to Ricci DeTurck flow in four dimensions on closed manifolds which are instantaneously smooth but whose initial values g are (possibly) non-smooth Riemannian metrics whose components in smooth coordinates belong to W2,2 and satisfy 1ah≤ g≤ a h for some 1<a<∞ and some smooth Riemannian metric h on M. A Ricci flow related solution is constructed whose initial value is isometric in a weak sense to the initial value of the Ricci DeTurck solution. Results for a related non-compact setting are also presented. Various Lp estimates for Ricci flow, which we require for some of the main results, are also derived. As an application we present a possible definition of scalar curvature ≥ k for W2,2 metrics g on closed four manifolds which are bounded in the L∞ sense by 1ah≤ g≤ a h for some 1<a<∞ and some smooth Riemannian metric h on M.