Bilaplacians problems with a sign-changing coefficient

Abstract

We investigate the properties of the operator (σ.):H20()-> H-2(), where σ is a given parameter whose sign can change on the bounded domain . Here, H20() denotes the subspace of H2() made of the functions w such that w=.∇ w=0 on the boundary. The study of this problem arises when one is interested in some configurations of the Interior Transmission Eigenvalue Problem. We prove that (σ.):H20()-> H-2() is a Fredholm operator of index zero as soon as σ∈ L∞(), with σ-1∈ L∞(), is such that σ remains uniformly positive (or uniformly negative) in a neighbourhood of the boundary. We also study configurations where σ changes sign on the boundary and we prove that Fredholm property can be lost for such situations. In the process, we examine in details the features of a simpler problem where the boundary condition .∇ v=0 is replaced by σ v=0.