Scattering of Plane Compressional Waves by a Spherical Obstacle
- 1 March 1963
- journal article
- research article
- Published by AIP Publishing in Journal of Applied Physics
- Vol. 34 (3) , 493-499
- https://doi.org/10.1063/1.1729301
Abstract
The scattering of plane compressional waves by a spherical obstacle in an elastic solid, which was investigated by Ying and Truell is examined further. For a rigid inclusion, the boundary conditions are redefined to take into consideration the motion of the inclusion inside the solid. By a proper limiting process, it is shown that the solutions for a rigid insert, a fluid sphere, a cavity, or an obstacle in a fluid are all derivable from the general results of an elastic inclusion. The rates of energy scattering due to a small rigid obstacle (a«λ) are found to be inversely proportional to the fourth power of wavelength.This publication has 5 references indexed in Scilit:
- Scattering of Plane Waves by a Rigid Ribbon in a SolidJournal of Applied Physics, 1961
- Scattering of a Plane Transverse Wave by a Spherical Obstacle in an Elastic MediumJournal of Applied Physics, 1960
- Scattering of a Plane Longitudinal Wave by a Spherical Fluid Obstacle in an Elastic MediumThe Journal of the Acoustical Society of America, 1960
- Scattering of a Plane Longitudinal Wave by a Spherical Obstacle in an Isotropically Elastic SolidJournal of Applied Physics, 1956
- Problems relating to the Impact of Waves on a Spherical Obstacle in an Elastic MediumProceedings of the London Mathematical Society, 1900