Imaging of complex-valued tensors for two-dimensional Maxwell’s equations

Chenxi Guo; Guillaume Bal

doi:10.1515/jiip-2015-0013

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Imaging of complex-valued tensors for two-dimensional Maxwell’s equations

Chenxi Guo und Guillaume Bal

Veröffentlicht/Copyright: 12. Mai 2016

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Aus der Zeitschrift Journal of Inverse and Ill-posed Problems Band 25 Heft 2

Abstract

This paper concerns the imaging of a complex-valued anisotropic tensor γ=σ+𝜾⁢ω⁢ε from knowledge of several inter magnetic fields H, where H satisfies the anisotropic Maxwell system on a bounded domain X⊂ℝ2 with prescribed boundary conditions on ∂⁡X. We show that γ can be uniquely reconstructed with a loss of two derivatives from errors in the acquisition H. A minimum number of five well-chosen functionals guaranties a local reconstruction of γ in dimension two. The explicit inversion procedure is presented in several numerical simulations, which demonstrate the influence of the choice of boundary conditions on the stability of the reconstruction. This problem finds applications in the medical imaging modalities Current Density Imaging and Magnetic Resonance Electrical Impedance Tomography.

Keywords: Anisotropic inverse problems; coupled-physics medical imaging; Maxwell’s equations

MSC 2010: 35J99; 35R30; 92C55

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Received: 2015-1-24

Revised: 2015-12-28

Accepted: 2016-3-30

Published Online: 2016-5-12

Published in Print: 2017-4-1

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Artikel in diesem Heft

https://doi.org/10.1515/jiip-2015-0013

Schlagwörter für diesen Artikel

Anisotropic inverse problems; coupled-physics medical imaging; Maxwell’s equations