The Soap Bubble Theorem and a p-Laplacian overdetermined problem
Abstract
We consider the p-Laplacian equation -p u=1 for 1<p<2, on a regular bounded domain ⊂ RN, with N2, under homogeneous Dirichlet boundary conditions. In the spirit of Alexandrov's Soap Bubble Theorem and of Serrin's symmetry result for the overdetermined problems, we prove that if the mean curvature H of ∂ is constant, then is a ball and the unique solution of the Dirichlet p-Laplacian problem is radial. The main tools used are integral identities, the P-function, and the maximum principle.
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