Wave scattering from self-affine surfaces

A.A. Maradudin; A.G. Voronovich; B.B. Mandelbrot; C.J.R. Sheppard; D.L. Jaggard; D.L. Jordan; Damien Vandembroucq; E. Bouchaud; F. Plouraboué; Ingve Simonsen; J. A. Ogilvy; J. Chen; J.A. Sánchez-Gil; J.A. Sánchez-Gil; J.W.S. Rayleigh; M. Nieto-Vesperinas; M.K. Shepard; M.V. Berry; N. Lin; P. Beckmann; P. Meakin; P.E. McSharry; Stéphane Roux; Y-P Zhao

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Wave scattering from self-affine surfaces

Authors: A.A. Maradudin
A.G. Voronovich
B.B. Mandelbrot
C.J.R. Sheppard
D.L. Jaggard
D.L. Jordan
Damien Vandembroucq
E. Bouchaud
F. Plouraboué
Ingve Simonsen
J. A. Ogilvy
J. Chen
J.A. Sánchez-Gil
J.A. Sánchez-Gil
J.W.S. Rayleigh
M. Nieto-Vesperinas
M.K. Shepard
M.V. Berry
N. Lin
P. Beckmann
P. Meakin
P.E. McSharry
Stéphane Roux
Y-P Zhao
Publication date: 9 July 1999
Publisher: 'American Physical Society (APS)'
Doi

Abstract

Electromagnetic wave scattering from a perfectly reflecting self-affine surface is considered. Within the framework of the Kirchhoff approximation, we show that the scattering cross section can be exactly written as a function of the scattering angle via a centered symmetric Levy distribution for general roughness amplitude, Hurst exponent and wavelength of the incident wave. The amplitude of the specular peak, its width and its position are discussed as well as the power law decrease (with scattering angle) of the scattering cross section.Comment: RevTeX, 4 pages including 2 figures. Submitted Phys. Rev. Let

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