Hubert Bray, Pengzi Miao
Published 2007-07-23Version 1
Given a surface in an asymptotically flat 3-manifold with nonnegative scalar curvature, we derive an upper bound for the capacity of the surface in terms of the area of the surface and the Willmore functional of the surface. The capacity of a surface is defined to be the energy of the harmonic function which equals 0 on the surface and goes to 1 at infinity. Even in the special case of Euclidean space, this is a new estimate. More generally, equality holds precisely for a spherically symmetric sphere in a spatial Schwarzschild 3-manifold. As applications, we obtain inequalities relating the capacity of the surface to the Hawking mass of the surface and the total mass of the asymptotically flat manifold.
Comments: 18 pages
Journal: Invent. math. 172, 459-475 (2008)
Positive mass theorem and the boundary behaviors of compact manifolds with nonnegative scalar curvature
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Surfaces of revolution in the Heisenberg group and the spectral generalization of the Willmore functional
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