Title :
Inverse scattering for shape and conductivity
Author :
Chien, Wei ; Chin, Chien Ching
Author_Institution :
Dept. of Electr. Eng., Tamkang Univ., Taipei, Taiwan
fDate :
Oct. 28 2003-Nov. 1 2003
Abstract :
We consider the inverse problem of determining both the shape and the conductivity of a two-dimensional conducting scatterer from a knowledge of the far-field pattern of TM waves by solving the ill posed nonlinear equation. Based on the boundary condition and the measured scattered field, a set of nonlinear integral equations is derived and the imaging problem is reformulated into an optimization problem. Satisfactory reconstructions have been achieved by the genetic algorithm. Numerical results demonstrated that, even when the initial guess is far away from the exact one, good reconstruction has been obtained. Numerical results show that multiple incident directions permit good reconstruction of shape and conductivity.
Keywords :
conducting bodies; electromagnetic wave scattering; genetic algorithms; integral equations; inverse problems; nonlinear equations; TM waves; boundary condition; conductivity reconstruction; far-field pattern; genetic algorithm; ill posed nonlinear equation; imaging problem; inverse scattering; multiple incident directions; nonlinear integral equations; optimization problem; satisfactory reconstructions; shape reconstruction; two-dimensional conducting scatterer; Conductivity; Current density; Electromagnetic scattering; Genetic algorithms; Image reconstruction; Integral equations; Inverse problems; Nonlinear equations; Shape; Surface impedance;
Conference_Titel :
Antennas, Propagation and EM Theory, 2003. Proceedings. 2003 6th International SYmposium on
Conference_Location :
Beijing, China
Print_ISBN :
0-7803-7831-8
DOI :
10.1109/ISAPE.2003.1276722
