A new symmetry criterion based on the distance function and applications to PDE's

Abstract

We prove that, if ⊂ Rn is an open bounded starshaped domain of class C2, the constancy over ∂ of the function (y) = ∫0λ(y) Πj=1n-1[1-t j(y)]\, dt implies that is a ball. Here kj(y) and λ(y) denote respectively the principal curvatures and the cut value of a boundary point y ∈ ∂ . We apply this geometric result to different symmetry questions for PDE's: an overdetermined system of Monge-Kantorovich type equations (which can be viewed as the limit as p + ∞ of Serrin's symmetry problem for the p-Laplacian), and equations in divergence form whose solutions depend only on the distance from the boundary in some subset of their domain.