Mathematical and Numerical Methods in Inverse Acoustic Scattering Theory

This paper presents a numerical method for predicting the acoustic scattering from two-dimensional (2-D) thin bodies. Both the Dirichlet and Neumann problems are considered. Applying the thin-body formulation leads to the boundary integral equations involving weakly singular and hypersingular kernel

## Abstract We consider the inverse scattering problem of determining the shape of a perfect conductor __D__ from a knowledge of the scattered electromagnetic wave generated by a time‐harmonic plane wave incident upon __D__. By using polarization effects we establish the validity of the linear samp

In this article a numerical method that makes use of ( ) matrix in¨ersion to sol¨e the Gel'fand᎐Le¨itan᎐Marchenko GLM integral equation for electromagnetic in¨erse scattering is presented. The algorithm is ¨alidated by comparing it to the analytic solution of the in¨erse problem for the reflection c

In this paper the application of the two-dimensional boundary element method to the scattering of plane sound waves from an infinite cylinder in a fluid is presented. The acoustic equation of the wave motion in a barotropic, inviscid fluid is deduced from the linearized hydrodynamics equations and t

Robust Statistics Sets Out To Explain The Use Of Robust Methods And Their Theoretical Justification. It Provides An Up-to-date Overview Of The Theory And Practical Application Of Robust Statistical Methods In Regression, Multivariate Analysis, Generalized Linear Models And Time Series. Robust Statis