Symmetry for a general class of overdetermined elliptic problems

Abstract

Let be a bounded domain in R N , and let u∈ C1 ( ) be a weak solution of the following overdetermined BVP: -∇ (g(|∇ u|)|∇ u|-1 ∇ u )=f(|x|,u), u>0 in and u(x)=0, \ |∇ u (x)| =λ (|x|) on ∂ , where g∈ C([0,+∞ )) C1 ((0,+∞ ) ) with g(0)=0, g'(t)>0 for t>0, f∈ C([0,+∞ )) × [0, +∞ ) ), f is nonincreasing in |x|, λ ∈ C([0, +∞ )) and λ is positive and nondecreasing. We show that is a ball and u satisfies some "local" kind of symmetry. The proof is based on the method of continuous Steiner symmetrization.