Generalized spectrum of the (p,2)-Laplacian under a parametric boundary condition

Abstract

In this paper we study an eigenvalue problem for the so called (p,2)-Laplace operator on a smooth bounded domain under a nonlinear Steklov type boundary condition, namely equation \ aligned -pu- u & =λ a(x)u \ \ in\ ,\\ (|∇ u|p-2+1)∂ u∂ & =λ b(x)u \ \ on\ ∂ . aligned . equation Under suitable integrability and boundedness assumptions on the positive weight functions a and b, we show that, for all p>1, the eigenvalue set consists of an isolated null eigenvalue plus a continuous family of eigenvalues located away from zero.