On a Modification of the Dynamic Regularization Method

Maksimov, V. I.

doi:10.1134/S0012266121080152

On a Modification of the Dynamic Regularization Method

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Published: 05 September 2021

Volume 57, pages 1119–1123, (2021)
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V. I. Maksimov¹

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Abstract

A regularizing algorithm is presented for solving the problem of dynamic reconstruction of an unknown input in a nonlinear vector differential equation. The algorithm is stable under information noise and computational errors.

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REFERENCES

Osipov, Yu.S., Vasil’ev, F.P., and Potapov, M.M., Osnovy metoda dinamicheskoi regulyarizatsii (Basics of the Dynamic Regularization Method), Moscow: Izd. Mosk. Gos. Univ., 1999.
Google Scholar
Osipov, Yu.S. and Kryazhimskii, A.V., Inverse Problems for Ordinary Differential Equations: Dynamical Solutions, London: Gordon and Breach Sci. Publ., 1995.
MATH Google Scholar
Osipov, Yu.S., Kryazhimskii, A.V., and Maksimov, V.I., Metody dinamicheskogo vosstanovleniya vkhodov upravlyaemykh sistem (Methods for Dynamic Reconstruction of Inputs of Controlled systems), Yekaterinburg: Ural. Otd. Ross. Akad. Nauk, 2011.
Google Scholar
Osipov, Yu.S., Kryazhimskii, A.V., and Maksimov, V.I., Some algorithms for dynamic reconstruction of inputs, Tr. Inst. Mat. Mekh. Ural. Otd. Ross. Akad. Nauk, 2011, vol. 17, no. 1, pp. 129–161.
MathSciNet MATH Google Scholar
Osipov, Yu.S., Kryazhimskii, A.V., and Maksimov, I.I., Dynamic inverse problems for parabolic systems, Differ. Equations, 2000, vol. 36, no. 5, pp. 643–661.
Article MathSciNet Google Scholar
Kryazhimskii, A.V., Continuity of Lebesgue sets in the optimal control problem, in Zadachi optimizatsii i ustoichivosti v upravlyaemykh sistemakh (Optimization and Stability Problems in Controlled Systems), Sverdlovsk: Ural. Otd. Akad. Nauk SSSR, 1990, pp. 54–73.
Google Scholar
Krasovskii, N.N. and Subbotin, A.I., Pozitsionnye differentsial’nye igry (Positional Differential Games), Moscow: Fizmatlit, 1974.
Google Scholar

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Authors and Affiliations

Krasovskii Institute of Mathematics and Mechanics, Ural Branch, Russian Academy of Sciences, Yekaterinburg, 620108, Russia
V. I. Maksimov

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V. I. Maksimov
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Correspondence to V. I. Maksimov.

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Translated by V. Potapchouck

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Maksimov, V.I. On a Modification of the Dynamic Regularization Method. Diff Equat 57, 1119–1123 (2021). https://doi.org/10.1134/S0012266121080152

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Received: 07 November 2020
Revised: 09 March 2021
Accepted: 08 June 2021
Published: 05 September 2021
Issue Date: August 2021
DOI: https://doi.org/10.1134/S0012266121080152

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