On two functionals connected to the Laplacian in a class of doubly connected domains in space-forms

Abstract

Let B1 be a ball of radius r1 in Sn(n), and let B0 be a smaller ball of radius r0 such that B0⊂ B1. For Sn we consider r1< π. Let u be a solution of the problem - u =1 in := B1 B0 vanishing on the boundary. It is shown that the associated functional J() is minimal if and only if the balls are concentric. It is also shown that the first Dirichlet eigenvalue of the Laplacian on is maximal if and only if the balls are concentric.

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