On the eigenvalue problem involving the weighted p-Laplacian in radially symmetric domains

Abstract

We investigate the following eigenvalue problem align* cases -div( L(x) |∇ u| p-2∇ u)=λ K(x)|u|p-2u in AR1R2 , u=0 on ∂ AR1R2 , cases align* where AR1R2:=\x∈RN: R1<|x|<R2\ (0< R1<R2≤∞), λ>0 is a parameter, the weights L and K are measurable with L positive a.e. in AR1R2 and K possibly sign-changing in AR1R2. We prove the existence of the first eigenpair and discuss the regularity and positiveness of eigenfunctions. %apriori bounds of any eigenfunction as well as local boundedness. The asymptotic estimates for u(x) and ∇ u(x) as |x| R1+ or R2- are also investigated.