Ernst Kuwert, Julian Scheuer
Published 2019-06-06Version 1
Kuwert and Sch\"atzle showed in 2001 that the Willmore flow converges to a standard round sphere, if the initial energy is small. In this situation, we prove stability estimates for the barycenter and the quadratic moment of the surface. Moreover, in codimension one we obtain stability bounds for the enclosed volume and averaged mean curvature. As direct applications, we recover a quasi-rigidity estimate due to De Lellis and M\"uller (2006) and an estimate for the isoperimetric deficit by R\"oger and Sch\"atzle (2012), whose original proofs used different methods.
Asymptotic estimates and compactness of expanding gradient Ricci solitons
Asymptotic estimates on the time derivative of entropy on a Riemannian manifold
Stability estimates for the conformal group of $\mathbb{S}^{n-1}$ in dimension $n\geq 3$
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