Optimal rigidity estimates for nearly umbilical surfaces in arbitrary codimension

Abstract

In [dLMu05], DeLellis and M\"uller proved a quantitative version of Codazzi's theorem, namely for a smooth embedded surface \ ⊂eq R3\ with area normalized to \ H2() = 4 π\ , it was shown that \ A - id L2() ≤ C A0 L2()\ , and building on this, closeness of \ \ to a round sphere in \ W2,2\ was established, when \ A0 L2()\ is small. This was supplemented in [dLMu06] by giving a conformal parametrization \ S2 ≈ \ with small conformal factor in \ L∞\ , again when \ A0 L2()\ is small. In this article, we extend these results to arbitrary codimension. In contrast to [dLMu05], our argument is not based on the equation of Mainardi-Codazzi, but instead uses the monotonicity formula for varifolds.