Quantitative rigidity results for conformal immersions
Abstract
In this paper we prove several quantitative rigidity results for conformal immersions of surfaces in Rn with bounded total curvature. We show that (branched) conformal immersions which are close in energy to either a round sphere, a conformal Clifford torus, an inverted catenoid, an inverted Enneper's minimal surface or an inverted Chen's minimal graph must be close to these surfaces in the W2,2-norm. Moreover, we apply these results to prove a corresponding rigidity result for complete, connected and non-compact surfaces.
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