INFINITELY MANY EMBEDDED EIGENVALUES FOR THE NEUMANN-POINCARE OPERATOR IN 3D
Author ORCID Identifier
This article constructs a surface whose Neumann-Poincare (NP) integral operator has infinitely many eigenvalues embedded in its essential spectrum. The surface is a sphere perturbed by smoothly attaching a conical singularity, which imparts the essential spectrum. Rotational symmetry allows a decomposition of the operator into Fourier components. Eigenvalues of infinitely many Fourier components are constructed so that they lie within the essential spectrum of other Fourier components and thus within the essential spectrum of the full NP operator. The proof requires the perturbation to be sufficiently small, with controlled curvature, and the conical singularity to be sufficiently flat.
Publication Source (Journal or Book title)
SIAM JOURNAL ON MATHEMATICAL ANALYSIS
Li, W., Perfekt, K., & Shipman, S. P. (2022). INFINITELY MANY EMBEDDED EIGENVALUES FOR THE NEUMANN-POINCARE OPERATOR IN 3D. SIAM JOURNAL ON MATHEMATICAL ANALYSIS, 54 (1), 343-362. https://doi.org/10.1137/21M1400365