Steklov spectra uniquely determine almost all triangles among triangles, distinguish polygons from smooth domains, and restrict edge lengths for higher n-gons.
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The survey describes eigenvalue inequalities, spectral asymptotics, nodal domains, and new phenomena for the Dirichlet-to-Neumann map of the Helmholtz equation that do not appear in the Laplace case.
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The Steklov spectrum of convex polygonal domains II: investigating spectral determination
Steklov spectra uniquely determine almost all triangles among triangles, distinguish polygons from smooth domains, and restrict edge lengths for higher n-gons.
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Spectral properties of the Dirichlet-to-Neumann map for the Helmholtz equation
The survey describes eigenvalue inequalities, spectral asymptotics, nodal domains, and new phenomena for the Dirichlet-to-Neumann map of the Helmholtz equation that do not appear in the Laplace case.
- Noncommutative Geometry, Spectral Asymptotics, and Semiclassical Analysis