Sharp estimates for the first Robin eigenvalue of nonlinear elliptic operators

Abstract

The aim of this paper is to obtain optimal estimates for the first Robin eigenvalue of the anisotropic p-Laplace operator, namely: equation* λ1(β,)=∈ W1,p()\0\ ∫ F(∇ )p dx +β ∫∂||pF() d HN-1 ∫||p dx, equation* where p∈]1,+∞[, is a bounded, mean convex domain in RN, is its Euclidean outward normal, β is a real number, and F is a sufficiently smooth norm on RN. The estimates we found are in terms of the first eigenvalue of a one-dimensional nonlinear problem, which depends on β and on geometrical quantities associated to . More precisely, we prove a lower bound of λ1 in the case β>0, and a upper bound in the case β<0. As a consequence, we prove, for β>0, a lower bound for λ1(β,) in terms of the anisotropic inradius of and, for β<0, an upper bound of λ1(β,) in terms of β.