Diameter Controls and Smooth Convergence away from Singular Sets

Abstract

We prove that if a family of metrics, gi, on a compact Riemannian manifold, Mn, have a uniform lower Ricci curvature bound and converge to g∞ smoothly away from a singular set, S, with Hausdorff measure, Hn-1(S) = 0, and if there exists connected precompact exhaustion, Wj, of Mn S satisfying gi(Mn) D0 , gi(∂ Wj) A0 and gi(Mn Wj) Vj where j∞Vj=0 then the Gromov-Hausdorff limit exists and agrees with the metric completion of (Mn S, g∞). Recall that in the prior work with Sormani the same conclusion is reached but the singular set is assumed to be a submanifold of codimension two. We have a second main theorem in which the Hausdorff measure condition on S is replaced by diameter estimates on the connected components of the boundary of the exhaustion, ∂ Wj. In addition, we show that the uniform lower Ricci curvature bounds in these theorems can be replaced by the existence of a uniform linear contractibility function. If this condition is removed altogether, then we prove that j ∞ dF(Mj', N')=0, in which Mj' and N' are the settled completions of (M, gj) and (M∞ S, g∞) respectively and dF is the Sormani-Wenger Intrinsic Flat distance. We present examples demonstrating the necessity of many of the hypotheses in our theorems.