Open AccessScattering of elastic waves by a spherical inclusion–II. Limitations of asymptotic solutions
Author(s) -
Korneev Valeri A.,
Johnson Lane R.
Publication year - 1993
Publication title -
geophysical journal international
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.302
H-Index - 168
eISSN - 1365-246X
pISSN - 0956-540X
DOI - 10.1111/j.1365-246x.1993.tb05602.x
Subject(s) - rayleigh scattering , scattering , homogeneous , exact solutions in general relativity , range (aeronautics) , mathematical analysis , physics , plane wave , field (mathematics) , plane (geometry) , mie scattering , mathematics , computational physics , classical mechanics , optics , light scattering , geometry , statistical physics , materials science , pure mathematics , composite material
Summary Starting with the exact solution for the scattering of a plane P wave by a homogeneous spherical inclusion, various types of approximate solutions are developed and discussed. The standard Rayleigh and Mie approximations are extended to the case of inclusions having arbitrary contrasts in material properties. For the low‐contrast case, solutions are developed which are valid over a wide frequency range. Several aspects of these solutions are discussed, including the importance of near‐field terms and the relative strength of the scattered P and S fields. The various types of approximate solutions are compared with each other and with the exact solution by calculating and displaying their normalized scattering cross‐sections.