Title :
Axially incident plane-wave scattering from an impedance sphere with two constant isotropic impedance surfaces
Author :
Johnson, William A. ; Koontz, Terry E. ; Jorgenson, Roy E.
Author_Institution :
Electromagn. Anal. & Test Dept., Sandia Nat. Labs., Albuquerque, NM, USA
fDate :
2/1/1996 12:00:00 AM
Abstract :
The canonical problem of an axially symmetric, isotropic impedance sphere with two constant impedance surfaces is formulated and solved for the case of a normally incident plane wave. Although the solution involves the truncation of an infinite series and numerical inversion of a linear system, its properties of a rapidly converging truncation process, evaluation of matrix elements in terms of known special functions, and rapid generation of remaining modal coefficients allow for an accurate representation of the fields. This is especially important near the impedance junction where discontinuities in some field components are expected. These properties make this solution an ideal test case for more general scattering codes
Keywords :
convergence of numerical methods; electric impedance; electromagnetic fields; electromagnetic wave scattering; inverse problems; matrix algebra; series (mathematics); axially incident plane-wave scattering; canonical problem; constant isotropic impedance surfaces; discontinuities; field components; fields representation; functions; general scattering codes; impedance junction; impedance sphere; infinite series; isotropic impedance sphere; linear system; matrix elements; modal coefficients; normally incident plane wave; numerical inversion; truncation; Boundary conditions; Electromagnetic analysis; Electromagnetic scattering; Geometry; Laboratories; Linear systems; Surface impedance; Surface waves; Symmetric matrices; Testing;
Journal_Title :
Antennas and Propagation, IEEE Transactions on
