Rigidity of compact rank one symmetric spaces
Abstract
We consider rigidity properties of compact symmetric spaces X with metric g0 of rank one. Suppose g is another Riemannian metric on X with sectional curvature bounded by 0 ≤ ≤ 1. If g equals g0 outside a convex proper subset of X, then g is isometric with g0. We also exhibit examples of surfaces showing that the nonnegativity of the curvature is needed. Our main result complements earlier results on other symmetric spaces by Gromov and Schroeder-Ziller.
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