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Datum
2013-10-26Typ
- Working Paper
ETH Bibliographie
yes
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Abstract
Given a 3-dimensional Riemannian manifold (M,g) , we prove that if (Φ k ) is a sequence of Willmore spheres (or more generally area-constrained Willmore spheres), having Willmore energy bounded above uniformly strictly by 8π , and Hausdorff converging to a point p ¯ ∈M , then Scal(p ¯ )=0 and ∇Scal(p ¯ )=0 (resp. ∇Scal(p ¯ )=0 ). Moreover, a suitably rescaled sequence smoothly converges, up to subsequences and reparametrizations, to a round sphere in the euclidean 3-dimensional space. This generalizes previous results of Lamm and Metzger contained in \cite{LM1}-\cite{LM2}. An application to the Hawking mass is also established. Mehr anzeigen
Publikationsstatus
publishedSeiten / Artikelnummer
Organisationseinheit
03600 - Rivière, Tristan / Rivière, Tristan
Anmerkungen
Submitted on 26 October 2013.ETH Bibliographie
yes
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