Quantitative Stability of the Clifford Torus as a Willmore Minimizer

Abstract

For an integral 2-varifold V⊂ S3 with square-integrable mean curvature, unit density, and support of genus at least 1, assume that its Willmore energy satisfies \[ W(V) 2π2+δ2, δ<δ01. \] We show that the support =sptV is, after applying a suitable conformal transformation of S3, quantitatively close to the Clifford torus. More precisely, under an appropriate conformal normalization, the surface admits a W2,2 conformal parametrization by the flat torus whose conformal factor and metric coefficients differ from those of the Clifford torus by at most Cδ.

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