Abstract
AbstractIn Chap. 3 we have demonstrated that the scattering problems of our interest are solved approximately if knowing a finite series expansion of the primary incident field at the scatterer surface \(\partial \Gamma \) in terms of the radiating eigensolutions of the Helmholtz and vector-wave equation, respectively. From this we could obtain an approximation of the scattered field everywhere in the outer region \(\Gamma _+\) which is also given by a series expansion in terms of the radiating eigensolutions.KeywordsDyadic Green's FunctionPrimary Incident FieldSurface ScatteringVector Wave EquationFinite Series ExpansionThese keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.
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