Classical, linear, electromagnetic impedance theory with infinite integrable discontinuities
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Publication:3357726
DOI10.1063/1.528618zbMath0732.47011OpenAlexW2025815450MaRDI QIDQ3357726
Publication date: 1990
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1063/1.528618
direct scattering problemclassical, linear electromagnetic scattering from a compact obstacle with a finite number of nonintersecting boundariesimpedance theoryMaxwell scattering equations
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Cites Work
- Theory of nonlocal piezoelectricity
- Uniqueness of the inverse scattering problem for the wave equation with a potential depending on time
- The Newton-Marchenko equation for time-dependent potentials
- On modeling discontinuous media. Three-dimensional scattering
- On modeling discontinuous media. One-dimensional approximations
- Transient direct and inverse scattering for inhomogeneous viscoelastic media: obliquely incident SH mode
- Distributional geometry
- Jump conditions for fields that have infinite, integrable singularities at an interface
- Extension of the one-dimensional scattering theory, and ambiguities
- Inverse problems for nonabsorbing media with discontinuous material properties
- Remark on the three-dimensional mixed impedance potential equation
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