Stability of Tori under Lower Sectional Curvature
Abstract
Let (Mni, gi) (X,dX) be a Gromov-Hausdorff converging sequence of Riemannian manifolds with Secgi -1, diam\, (Mi) D, and such that the Mni are all homeomorphic to tori Tn. Then X is homeomorphic to a k-dimensional torus Tk for some 0≤ k≤ n. This answers a question of Petrunin in the affirmative. We show this result is false is the Mni are homeomorphic tori which are only assumed to be Alexandrov spaces. When n=3, we prove the same tori stability under the weaker condition Ricgi -2.
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