Title :
Time-domain BIE analysis of large three-dimensional electromagnetic scattering problems
Author :
Bluck, M.J. ; Walker, S.P.
Author_Institution :
Imperial Coll. of Sci., Technol. & Med., London, UK
fDate :
5/1/1997 12:00:00 AM
Abstract :
A time-domain boundary integral equation (BIE) solution of the magnetic field integral equation (MFIE) for large electromagnetic scattering problems is presented. It employs isoparametric curvilinear quadratic elements to model fields, geometry, and time dependence, eliminating staircasing problems. The approach is implicit, which seems to provide both stability and permits arbitrary local mesh refinement to model geometrically difficult regions without the significant cost penalty explicit methods suffer. Error dependence on discretization is investigated; accurate results are obtained with as few as five nodes per wavelength. The performance both on large scatterers and on low-radar cross section (RCS) scatterers is demonstrated, including the six wavelength “NASA almond,” two spheres, a thirteen wavelength missile, and a “high-Q” cavity
Keywords :
boundary integral equations; electromagnetic wave scattering; error analysis; magnetic fields; mesh generation; missiles; numerical stability; radar cross-sections; time-domain analysis; MFIE; NASA almond; RCS; boundary integral equation; error dependence; geometrically difficult regions; geometry; high-Q cavity; isoparametric curvilinear quadratic elements; large 3D EM scattering problems; local mesh refinement; low-radar cross section scatterers; magnetic field integral equation; mesh generation; missile; perfect conductors; performance; spheres; stability; time dependence; time-domain BIE analysis; time-domain solution; Costs; Electromagnetic analysis; Electromagnetic scattering; Geometry; Integral equations; Magnetic analysis; Magnetic fields; Solid modeling; Stability; Time domain analysis;
Journal_Title :
Antennas and Propagation, IEEE Transactions on
