Quantitative Volume Space Form Rigidity Under Lower Ricci Curvature Bound

Abstract

Let M be a compact n-manifold of RicM (n-1)H (H is a constant). We are concerned with the following space form rigidity: M is isometric to a space form of constant curvature H under either of the following conditions: (i) There is >0 such that for any x∈ M, the open -ball at x* in the (local) Riemannian universal covering space, (U*,x*) (B(x),x), has the maximal volume i.e., the volume of a -ball in the simply connected n-space form of curvature H. (ii) For H=-1, the volume entropy of M is maximal i.e. n-1 ([LW1]). The main results of this paper are quantitative space form rigidity i.e., statements that M is diffeomorphic and close in the Gromov-Hausdorff topology to a space form of constant curvature H, if M almost satisfies, under some additional condition, the above maximal volume condition. For H=1, the quantitative spherical space form rigidity improves and generalizes the diffeomorphic sphere theorem in [CC2].