Gelfand-Levitan-Krein method in one-dimensional elasticity inverse problem

Sergey I. Kabanikhin; Nikita S. Novikov; Maxim A. Shishlenin

doi:10.1088/1742-6596/2092/1/012022

Gelfand-Levitan-Krein method in one-dimensional elasticity inverse problem

Sergey I. Kabanikhin, Nikita S. Novikov, Maxim A. Shishlenin

Research output: Contribution to journal › Conference article › peer-review

Abstract

In this article we propose the numerical solution of the one dimensional inverse coefficient problem for seismic equation. We use a dynamical version of Gelfand-Levitan-Krein approach for reducing a nonlinear inverse problem for recovering the shear wave's velocity and the density of the medium to two sequences of the linear integral equations. We propose numerical algorithm for solving these equations based on a fast inversion of a Toeplitz matrix. The proposed numerical methods base on the structure of the problem and therefore improve the efficiency of the algorithms, compared with standard approaches. We present numerical results for solving considered integral equations.

Original language	English
Article number	012022
Journal	Journal of Physics: Conference Series
Volume	2092
Issue number	1
DOIs	https://doi.org/10.1088/1742-6596/2092/1/012022
Publication status	Published - 20 Dec 2021
Event	11th International Scientific Conference and Young Scientist School on Theory and Computational Methods for Inverse and Ill-posed Problems - Novosibirsk, Russian Federation Duration: 26 Aug 2019 → 4 Sep 2019

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1.03 PHYSICAL SCIENCES AND ASTRONOMY

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title = "Gelfand-Levitan-Krein method in one-dimensional elasticity inverse problem",

abstract = "In this article we propose the numerical solution of the one dimensional inverse coefficient problem for seismic equation. We use a dynamical version of Gelfand-Levitan-Krein approach for reducing a nonlinear inverse problem for recovering the shear wave's velocity and the density of the medium to two sequences of the linear integral equations. We propose numerical algorithm for solving these equations based on a fast inversion of a Toeplitz matrix. The proposed numerical methods base on the structure of the problem and therefore improve the efficiency of the algorithms, compared with standard approaches. We present numerical results for solving considered integral equations.",

author = "Kabanikhin, {Sergey I.} and Novikov, {Nikita S.} and Shishlenin, {Maxim A.}",

note = "Funding Information: The research of N.S. Novikov was supported by RFBR, project number 18-31-00409. Publisher Copyright: {\textcopyright} 2021 Institute of Physics Publishing. All rights reserved.; 11th International Scientific Conference and Young Scientist School on Theory and Computational Methods for Inverse and Ill-posed Problems ; Conference date: 26-08-2019 Through 04-09-2019",

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doi = "10.1088/1742-6596/2092/1/012022",

language = "English",

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T1 - Gelfand-Levitan-Krein method in one-dimensional elasticity inverse problem

AU - Kabanikhin, Sergey I.

AU - Novikov, Nikita S.

AU - Shishlenin, Maxim A.

PY - 2021/12/20

Y1 - 2021/12/20

N2 - In this article we propose the numerical solution of the one dimensional inverse coefficient problem for seismic equation. We use a dynamical version of Gelfand-Levitan-Krein approach for reducing a nonlinear inverse problem for recovering the shear wave's velocity and the density of the medium to two sequences of the linear integral equations. We propose numerical algorithm for solving these equations based on a fast inversion of a Toeplitz matrix. The proposed numerical methods base on the structure of the problem and therefore improve the efficiency of the algorithms, compared with standard approaches. We present numerical results for solving considered integral equations.

AB - In this article we propose the numerical solution of the one dimensional inverse coefficient problem for seismic equation. We use a dynamical version of Gelfand-Levitan-Krein approach for reducing a nonlinear inverse problem for recovering the shear wave's velocity and the density of the medium to two sequences of the linear integral equations. We propose numerical algorithm for solving these equations based on a fast inversion of a Toeplitz matrix. The proposed numerical methods base on the structure of the problem and therefore improve the efficiency of the algorithms, compared with standard approaches. We present numerical results for solving considered integral equations.

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U2 - 10.1088/1742-6596/2092/1/012022

DO - 10.1088/1742-6596/2092/1/012022

M3 - Conference article

AN - SCOPUS:85124040575

VL - 2092

JO - Journal of Physics: Conference Series

JF - Journal of Physics: Conference Series

SN - 1742-6588

IS - 1

M1 - 012022

T2 - 11th International Scientific Conference and Young Scientist School on Theory and Computational Methods for Inverse and Ill-posed Problems

Y2 - 26 August 2019 through 4 September 2019

ER -

Gelfand-Levitan-Krein method in one-dimensional elasticity inverse problem

Abstract

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