Regularity of Einstein Manifolds and the Codimension 4 Conjecture

Abstract

In this paper, we are concerned with the regularity of noncollapsed Riemannian manifolds (Mn,g) with bounded Ricci curvature, as well as their Gromov-Hausdorff limit spaces (Mnj,dj)dGH (X,d), where dj denotes the Riemannian distance. Our main result is a solution to the codimension 4 conjecture, namely that X is smooth away from a closed subset of codimension 4. We combine this result with the ideas of quantitative stratification to prove a priori Lq estimates on the full curvature |Rm| for all q<2. In the case of Einstein manifolds, we improve this to estimates on the regularity scale. We apply this to prove a conjecture of Anderson that the collection of 4-manifolds (M4,g) with |RicM4|≤ 3, Vol(M)>v>0, and diam(M)≤ D contains at most a finite number of diffeomorphism classes. A local version of this is used to show that noncollapsed 4-manifolds with bounded Ricci curvature have a priori L2 Riemannian curvature estimates.