Fixed-point iterations in determining a Tikhonov regularization parameter in Kirsch’s factorization method

作者:

Highlights:

摘要

Kirsch’s factorization method is a fast inversion technique for visualizing the profile of a scatterer from measurements of the far-field pattern. The mathematical basis of this method is given by the far-field equation, which is a Fredholm integral equation of the first kind in which the data function is a known analytic function and the integral kernel is the measured (and therefore noisy) far-field pattern. We present a Tikhonov parameter choice approach based on a fast fixed-point iteration method which constructs a regularization parameter associated with the corner of the L-curve in log–log scale. The performance of the method is evaluated by comparing our reconstructions with those obtained via the L-curve and we conclude that our method yields reliable reconstructions at a lower computational cost.

论文关键词:Inverse scattering problems,Kirch’s factorization method,Tikhonov regularization,L-curve criterion

论文评审过程:Available online 8 June 2010.

论文官网地址:https://doi.org/10.1016/j.amc.2010.05.036