Perimeter on a manifold, with applications to partial differential equations
Abstract
The perimeter of a measurable subset of RN is the total variation of its characteristic function. We generalize this notion to a subset E of a closed Riemannian manifold. We show that the perimeter of E is the limit of the hear kernel regularization of its characteristic function. A generalization of the isoperimetric inequality and of the Fleming-Rishel formula follow. These results are applied to a quasilinear elliptic problem in RN for which the usual symmetrization methods fail. It will be tackled successfully by introducing a symmetrization method on the sphere.
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