Title :
RCS computation with paraxial methods
Author :
Levy, M.F. ; Borsboom, P.-P. ; Zaporozhets, A.A.
Author_Institution :
Rutherford Appleton Lab., Chilton, UK
Abstract :
Parabolic equation (PE) techniques are based on a paraxial approximation of the wave equation. The resulting parabolic partial differential equation (for scalar problems) or coupled parabolic equations (for vector problems) are solved by marching techniques, with substantial computational advantages. These paraxial methods have recently been applied to scattering problems. To indicate briefly the flavour of the method, we outline the basic derivation for the scalar wave equation.
Keywords :
wave equations; RCS computation; coupled parabolic equations; marching techniques; parabolic equation techniques; parabolic partial differential equation; paraxial methods; scalar problems; scalar wave equation; scattering problems; vector problems; wave equation; Acoustic scattering; Backscatter; Boundary conditions; Differential equations; Electromagnetic scattering; Grid computing; Laboratories; Partial differential equations; Refractive index; Terminology;
Conference_Titel :
Antennas and Propagation Society International Symposium, 1997. IEEE., 1997 Digest
Conference_Location :
Montreal, Quebec, Canada
Print_ISBN :
0-7803-4178-3
DOI :
10.1109/APS.1997.631761
