Geometric Structures of Collapsing Riemannian Manifolds I

Abstract

Let (Mni,gi,pi) be a sequence of smooth pointed complete n-dimensional Riemannian Manifolds with uniform bounds on the sectional curvatures and let (X,d,p) be a metric space such that (Mni,gi,pi) -> (X,d,p) in the Gromov-Hausdorff sense. Let O ⊂eq X be the set of points x ∈ X such that there exists a neighborhood of x which is isometric to an open set in a Riemannian orbifold and let B = Oc be the complement set. Then we have the sharp estimates dimHaus(B) ≤ minn-5, dimHaus(X)-3, and further for arbitrary x ∈ X we have that x ∈ O iff a neighborhood of x has bounded Alexandroff curvature. In particular, if n ≤ 4 then B is empty and (X,d) is a Riemannian orbifold. Our main application is to prove that a collapsed limit of Einstein four manifolds has a smooth Riemannian orbifold structure away from a finite number of points, and that near these points the curvatures has a -dist-2 lower bound.