Abstract
AbstractWe consider the scattering of an electromagnetic wave at an inhomogeneous and arbitrary shaped inclusion describing the inclusion as a non‐spherical perturbation. Thus, inhomogenety and arbitrarity in the shape are treated on the same footing. The fields are developed into vector spherical harmonics. The radial parts must be calculated from a coupled set of equations using the methods known from the scattering of a scalar field at a non‐spherical potential. Using an operator notation the lengthly expressions can be avoided, which contain the Clebsch‐Gordan coefficients.
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