On surface radiation conditions for high-frequency wave scattering

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摘要

A new approximation of the logarithmic derivative of the Hankel function is derived and applied to high-frequency wave scattering. We re-derive the on surface radiation condition (OSRC) approximations that are well suited for a Dirichlet boundary in acoustics. These correspond to the Engquist–Majda absorbing boundary conditions. Inverse OSRC approximations are derived and they are used for Neumann boundary conditions. We obtain an implicit OSRC condition, where we need to solve a tridiagonal system. The OSRC approximations are well suited for moderate wave numbers. The approximation of the logarithmic derivative is also used for deriving a generalized physical optics approximation, both for Dirichlet and Neumann boundary conditions. We have obtained similar approximations in electromagnetics, for a perfect electric conductor. Numerical computations are done for different objects in 2D and 3D and for different wave numbers. The improvement over the standard physical optics is verified.

论文关键词:Logarithmic derivative,On surface radiation condition,Physical optics,Acoustics,Electromagnetics

论文评审过程:Received 30 September 2005, Revised 17 February 2006, Available online 13 July 2006.

论文官网地址:https://doi.org/10.1016/j.cam.2006.02.045