Kha Van Huynh scite author profile

Kha Van Huynh

4Publications

8Citation Statements Received

218Citation Statements Given

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216

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University of Klagenfurt

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Some application examples of minimization based formulations of inverse problems and their regularization

Huynh¹,

Kaltenbacher²

2021

IPI

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In this paper we extend a recent idea of formulating and regularizing inverse problems as minimization problems, so without using a forward operator, thus avoiding explicit evaluation of a parameter-to-state map. We do so by rephrasing three application examples in this minimization form, namely (a) electrical impedance tomography with the complete electrode model (b) identification of a nonlinear magnetic permeability from magnetic flux measurements (c) localization of sound sources from microphone array measurements. To establish convergence of the proposed regularization approach for these problems, we first of all extend the existing theory. In particular, we take advantage of the fact that observations are finite dimensional here, so that inversion of the noisy data can to some extent be done separately, using a right inverse of the observation operator. This new approach is actually applicable to a wide range of real world problems.

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Iterative regularization for constrained minimization formulations of nonlinear inverse problems

Kaltenbacher

Huynh

2021

Comput Optim Appl

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In this paper we study the formulation of inverse problems as constrained minimization problems and their iterative solution by gradient or Newton type methods. We carry out a convergence analysis in the sense of regularization methods and discuss applicability to the problem of identifying the spatially varying diffusivity in an elliptic PDE from different sets of observations. Among these is a novel hybrid imaging technology known as impedance acoustic tomography, for which we provide numerical experiments.

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Some application examples of minimization based formulations of inverse problems and their regularization

Huynh¹,

Kaltenbacher²

2020

Preprint

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Iterative regularization for constrained minimization formulations of nonlinear inverse problems

Kaltenbacher¹,

Huynh²

2021

Preprint

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In this paper we the formulation of inverse problems as constrained minimization problems and their iterative solution by gradient or Newton type. We carry out a convergence analysis in the sense of regularization methods and discuss applicability to the problem of identifying the spatially varying diffusivity in an elliptic PDE from different sets of observations. Among these is a novel hybrid imaging techology known as impedance acoustic tomography, for which we provide numerical experiments.

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Kha Van Huynh

Some application examples of minimization based formulations of inverse problems and their regularization

Iterative regularization for constrained minimization formulations of nonlinear inverse problems

Some application examples of minimization based formulations of inverse problems and their regularization

Iterative regularization for constrained minimization formulations of nonlinear inverse problems

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