Perturbations of embedded eigenvalues for the planar bilaplacian

Details Perturbations of embedded eigenvalues for the planar bilaplacian Perturbations of embedded eigenvalues for the planar bilaplacian

2010-09-02

arxiv.org/abs/1009.0409v1

Mathematics

Functional Analysis

Scientific paper

Operators on unbounded domains may acquire eigenvalues that are embedded in the essential spectrum. Determining the fate of these embedded eigenvalues under small perturbations of the underlying operator is a challenging task, and the persistence properties of such eigenvalues is linked intimately to the multiplicity of the essential spectrum. In this paper, we consider the planar bilaplacian with potential and show that the set of potentials for which an embedded eigenvalue persists is locally an infinite-dimensional manifold with infinite codimension in an appropriate space of potentials.

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