Asymptotic Imaging of Perfectly Conducting Cracks

Ammari, Habib; Kang, Hyeonbae; Lee, Hyundae; Park, Won-Kwang

doi:10.1137/090749013

Cited by 86 publications

(97 citation statements)

References 30 publications

(35 reference statements)

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“…Based on recent works in [4,6,19,20,24], it has been shown that subspace migration offers better results than the MUSIC and Kirchhoff migration. Specially, subspace migration can be applied to limited-view inverse scattering problems.…”

Section: Resultsmentioning

confidence: 99%

“…To find a good initial guess, alternative non-iterative reconstruction algorithms have been developed, such as the MUltiple SIgnal Classification (MUSIC)-type algorithm [5,23,25], linear sampling method [8,12], topological derivative strategy [3,6,18,21,22], linear-δ, vector and multipolarized approaches [29,30], and the multifrequency based algorithm such as Kirchhoff and subspace migrations [2,4,15,19,20,24]. Among them, although the multi-frequency based subspace migration has exhibited potential as a non-iterative imaging technique, a mathematical identification of its structure needs to be performed for its heuristical applications, which is the motivation behind.…”

Section: Introductionmentioning

confidence: 99%

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Structure Analysis of Single- And 2 Multi-Frequency Subspace Migrations in 3 Inverse Scattering Problems

Jo¹,

Kwon²,

Huh³

et al. 2013

PIER

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Abstract-We carefully investigate the structure of single-and multifrequency imaging functions, that are usually employed in inverse scattering problems. Based on patterns of the singular vectors of the Multi-Static Response (MSR) matrix, we establish a relationship between imaging functions and the Bessel function. This relationship indicates certain properties of imaging functions and the reason behind enhancement in the imaging performance by multiple frequencies. Several numerical simulations with a large amount of noisy data are performed in order to support our investigation.

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Section: Resultsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Structure Analysis of Single- And 2 Multi-Frequency Subspace Migrations in 3 Inverse Scattering Problems

Jo¹,

Kwon²,

Huh³

et al. 2013

PIER

Self Cite

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show abstract

“…However, this method requires derivation of a complex Fréchet derivative, incurs large computational costs, and provides only a good initial guess regarding successful performance. Nevertheless, many practical experiments require starting with a good initial guess so alternative non-iterative imaging methods continue to be developed; e.g., the Multiple SIgnal Classification (MUSIC) algorithm [2], [3], linear sampling method [4], [5], and Kirchhoff migration [6], [7]. These appear to be fast and robust, and easily extend to the imaging of multiple cracks, but they still require a large number of incident fields with various directions and corresponding scattered field data.…”

Section: ⅰ Introductionmentioning

confidence: 99%

A Topological Derivative Based Non-Iterative Electromagnetic Imaging of Perfectly Conducting Cracks

Ma¹,

Park²

2012

Journal of electromagnetic engineering and science

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In this manuscript, we consider electromagnetic imaging of perfectly conducting cracks completely hidden in a homogeneous material via boundary measurements. For this purpose, we carefully derive a topological derivative formula based on the asymptotic expansion formula for the existence of a perfectly conducting inclusion with a small radius. With this, we introduce a topological derivative based imaging algorithm and discuss its properties. Various numerical examples with noisy data show the effectiveness and limitations of the imaging algorithm.

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“…But their approach seems not clear how to be applied for different impedances. On the other hand, we would like to point out the recent developments in connection with our studied problem and suggested techniques, specially for small cracks, see, e.g., [1,2].…”

Section: Introductionmentioning

confidence: 99%

Numerical Solution of the Scattering Problem for Acoustic Waves by a Two-Sided Crack in 2-Dimensional Space

Крутицкий¹,

Liu²,

Sini³

2011

JCM

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The wave scattering problem by a crack Γ in R 2 with impedance type boundary is considered. This problem models the diffraction of waves by thin two-sided cylindrical screens. A numerical method for solving the problem is developed. The solution of the problem is represented in the form of the combined angular potential and single-layer potential. The linear integral equations satisfied by the density functions are derived for general parameterized arcs. The weakly singular integrals and the Cauchy singular integral arising in these equations are computed using a highly accurate scheme with a truncation error analysis. The advantage of the scheme proposed in this paper is, in one hand, the fact that we do not need the analyticity property of the crack and we allow different complex valued surface impedances in both sides of the crack. In the other hand, we avoid the hyper-singular integrals. Numerical implementations showing the validity of the scheme are presented.Mathematics subject classification: 35P25, 35R30, 78A45.

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Asymptotic Imaging of Perfectly Conducting Cracks

Cited by 86 publications

References 30 publications

Structure Analysis of Single- And 2 Multi-Frequency Subspace Migrations in 3 Inverse Scattering Problems

Structure Analysis of Single- And 2 Multi-Frequency Subspace Migrations in 3 Inverse Scattering Problems

A Topological Derivative Based Non-Iterative Electromagnetic Imaging of Perfectly Conducting Cracks

Numerical Solution of the Scattering Problem for Acoustic Waves by a Two-Sided Crack in 2-Dimensional Space

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