An Asymptotic Representation Formula for Scattering by Thin Tubular Structures and an Application in Inverse Scattering

Yves Capdeboscq, Roland Griesmaier, Marvin Knöller
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引用次数: 5

Abstract

We consider the scattering of time-harmonic electromagnetic waves by a penetrable thin tubular scattering object in three-dimensional free space. We establish an asymptotic representation formula for the scattered wave away from the thin tubular scatterer as the radius of its cross-section tends to zero. The shape, the relative electric permeability and the relative magnetic permittivity of the scattering object enter this asymptotic representation formula by means of the center curve of the thin tubular scatterer and two electric and magnetic polarization tensors. We give an explicit characterization of these two three-dimensional polarization tensors in terms of the center curve and of the two two-dimensional polarization tensor for the cross-section of the scattering object. As an application we demonstrate how this formula may be used to evaluate the residual and the shape derivative in an efficient iterative reconstruction algorithm for an inverse scattering problem with thin tubular scattering objects. We present numerical results to illustrate our theoretical findings.
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薄管结构散射的渐近表示公式及其在逆散射中的应用
研究了三维自由空间中可穿透薄管散射体对时谐电磁波的散射。建立了离管状薄型散射体截面半径趋于零时散射波的渐近表示公式。散射物体的形状、相对电导率和相对磁介电常数通过细管散射体的中心曲线和两个电、磁极化张量进入这个渐近表示公式。我们给出了这两个三维偏振张量的中心曲线和两个二维偏振张量在散射物体截面上的显式表征。作为一个应用,我们演示了如何使用该公式来评估残差和形状导数在一个有效的迭代重建算法中的反散射问题与薄管散射目标。我们用数值结果来说明我们的理论发现。
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