Modica type estimates and curvature results for overdetermined p-Laplace problems

Abstract

In this paper we prove Modica type estimates for the following overdetermined p-Laplace problem equation* cases div (|∇ u|p-2∇ u)+f(u) =0& in , u>0 &in , u=0 &on ∂, ∂ u=- &on ∂, cases equation* where 1<p<+∞, f∈ C1(R), ⊂ Rn (n≥ 2) is a C1 domain (bounded or unbounded), is the exterior unit normal of ∂ and ≥ 0 is a constant. Based on Modica type estimates, we obtain rigidity results for bounded solutions. In particular, we prove that if there exists a nonpositive primitive F of f satisfying F(0)≥ -(p-1)p / p (for p>2 we also assume that if F(u0)=0, F(u)=O(|u-u0|p) as u→ u0), then either the mean curvature of ∂ is strictly negative or is a half-space.