L^p-stability and positive scalar curvature rigidity of Ricci-flat ALE manifolds
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We prove stability of integrable ALE manifolds with a parallel spinor under Ricci flow, given an initial metric which is close in $L^p \cap L^\infty$, for any $p \in (1, n)$, where $n$ is the dimension of the manifold. In particular, our result applies to all known examples of $4$-dimensional gravitational instantons. Our decay rates are strong enough to prove positive scalar curvature rigidity in $L^p$, for each $p \in \left[1, \frac{n}{n-2}\right)$, generalizing a result by Appleton.
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Forward citations
Cited by 2 Pith papers
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Convergence of the Yang-Mills flow on ALE gravitational instantons
The Yang-Mills flow converges sharply on SU(r)-bundles over locally hyperKähler ALE 4-manifolds.
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Integrable Deformations and Stability of the Ricci Flow
Simplified proof of dynamical stability for Ricci flow near integrable linearly stable Ricci-flat ALE metrics via almost-orthogonality of the Ricci-DeTurck tensor.
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