The ∞-eigenvalue problem with a sign-changing weight

Abstract

Let ⊂Rn be a smooth bounded domain and m∈ C() be a sign-changing weight function. For 1<p<∞, consider the eigenvalue problem \ array [c]ll -pu=λ m(x)|u|p-2u & in ,\\ u=0 & on ∂, array . where pu is the usual p-Laplacian. Our purpose in this article is to study the limit as p→∞ for the eigenvalues λ k,p( m) of the aforementioned problem. In addition, we describe the limit of some normalized associated eigenfunctions when k=1.