Some remarks on Willmore surfaces embedded in R3
Abstract
Let f:C→ R3 be complete Willmore immersion with ∫|Af|2<+∞. We will show that if f is the limit of an embedded surface sequence, then f is a plane. As an application, we prove that if k is a sequence of closed Willmore surface embedded in R3 with W(k)<C, and if the conformal class of k converges in the moduli space, then we can find a M\"obius transformation σk, such that a subsequence of σk(k) converges smoothly.
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