On the first eigenvalue of a nonlinear Schr\"odinger type equation

Abstract

We consider an eigenvalue problem for the generalized nonlinear Schr\"odinger type operator with the Robin boundary condition as given below. equation* ab-Robin p-Laplace evp with potential termintro \ split -p u+V(x)|u|p-2u&=λ |u|p-2u &&in ~,\\ |∇ u|p-2∂ u∂η+β|u|p-2u&=0 &&on~∂, split . equation* where p u := div(|∇ u|p-2∇ u) is the p-Laplace operator, is a bounded domain in Rn with smooth boundary, V ∈ C1(Rn), η denotes the outward unit normal, and β is a positive real constant. We study the properties of its first eigenvalue with respect to the potential V, the boundary parameter β as well as the domain. First, we establish some properties of the smallest eigenvalue λ1(V) with respect to the potential. We then prove the differentiability of λ1(V) with respect to the Robin boundary parameter β and give an explicit formula for this derivative, which is then used to investigate some monotonicity properties of λ1(V). We also obtain a shape derivative formula for the smallest eigenvalue. Using these derivatives, we also study domain monotonicity properties of the first eigenvalue.