A note on Ricci flow from small curvature concentration and a Morrey-type condition
Abstract
In ChauMartens the authors proved the long-time existence of Ricci flow starting from complete bounded curvature Riemannian manifolds with scale-invariant integral curvature bounded by a dimensional constant times the inverse of the Sobolev constant. We generalize this result by replacing the bounded curvature assumption with the assumption that g is only equivalent to a complete bounded curvature metric h while satisfying a Morrey-type condition on the gradient of g relative to h: a local integral condition on the covariant derivative ∇h g. The Morrey-type condition was first considered in LeeLiu in the context of Ricci flow on non-compact manifolds, and in particular allows the possibility for g to have unbounded curvature on M. As in ChauMartens, our long-time solution enjoys curvature decay estimates implying in particular that M is diffeomorphic to Rn.
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