Sobolev metrics on the manifold of all Riemannian metrics
Abstract
On the manifold (M) of all Riemannian metrics on a compact manifold M one can consider the natural L2-metric as described first by Ebin70. In this paper we consider variants of this metric which in general are of higher order. We derive the geodesic equations, we show that they are well-posed under some conditions and induce a locally diffeomorphic geodesic exponential mapping. We give a condition when Ricci flow is a gradient flow for one of these metrics.
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