Wide-angle nonlocal boundary conditions for the parabolic wave equation

Author

Hyaric, Anabelle Zebic-Le

Author_Institution

Radio Commun. Res. Unit, Rutherford Appleton Lab., Chilton, UK

Volume

49

Issue

6

fYear

2001

fDate

6/1/2001 12:00:00 AM

Firstpage

916

Lastpage

922

Abstract

Nonlocal boundary conditions offer a useful alternative to the traditional use of absorbing layers for implementation with parabolic equation computations. We set up nonlocal boundary conditions for use with the split-step Pade approximation of the parabolic wave equation. The great advantage of the resulting algorithm is that it solves wide-angle propagation problems without any loss of accuracy. Numerical results show that the propagation of plane waves is perfectly handled even when very large angles are involved

Keywords

approximation theory; electromagnetic wave propagation; parabolic equations; refractive index; wave equations; electromagnetic propagation; parabolic wave equation; plane wave propagation; refractive index constant; split-step Pade approximation; wide-angle nonlocal boundary conditions; wide-angle propagation problems; Acoustic propagation; Acoustic scattering; Boundary conditions; Electromagnetic propagation; Electromagnetic refraction; Impedance; Partial differential equations; Propagation losses; Radar cross section; Radar scattering;

fLanguage

English

Journal_Title

Antennas and Propagation, IEEE Transactions on

Publisher

ieee

ISSN

0018-926X

Type

jour

DOI

10.1109/8.931149

Filename

931149