The Willmore Conjecture for immersed tori with small curvature integral
classification
🧮 math.DG
keywords
conjecturecurvaturesmallwillmoreconditioneuclideanflatgaussian
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The Willmore conjecture states that any immersion F:T^2 -> R^n of a 2-torus into flat euclidean space satisfies $\int_{T^2} H^2\geq 2\pi^2$. We prove it under the condition that the L^p-norm of the Gaussian curvature is sufficiently small.
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