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Data Completion Method For the Helmholtz Equation Via Surface Potentials for Partial Cauchy Data

Abstract : We propose and study a data completion algorithm for recovering missing data from the knowledge of Cauchy data on parts of the same boundary. The algorithm is based on surface representation of the solution and is presented for the Helmholtz equation. This work is an extension of the data completion algorithm proposed by the two last authors where the case of data available of a closed boundary was studied. The proposed method is a direct inversion method robust with respect to noisy incompatible data. Classical regularization methods with discrepancy selection principles can be employed and automatically lead to a convergent schemes as the noise level goes to zero. We conduct 3D numerical investigations to validate our method on various synthetic examples.
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https://hal.inria.fr/hal-02416548
Contributor : Houssem Haddar <>
Submitted on : Tuesday, December 17, 2019 - 5:17:13 PM
Last modification on : Saturday, February 1, 2020 - 1:52:50 AM
Long-term archiving on: : Wednesday, March 18, 2020 - 9:13:39 PM

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  • HAL Id : hal-02416548, version 1

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Matthieu Aussal, Yosra Boukari, Houssem Haddar. Data Completion Method For the Helmholtz Equation Via Surface Potentials for Partial Cauchy Data. 2019. ⟨hal-02416548⟩

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