OPTIMAL CONTROL PROBLEM FOR SINGULARLY PERTURBED DIFFERENTIAL EQUATIONS

Authors

  • Aybek Toktorbaev Osh State University
  • Zhanara Toktomuratova Osh State University

DOI:

https://doi.org/10.52754/16948645_2024_2(5)_23

Keywords:

excitation, small parameter, differential equation, solution, starting point, optimal control

Abstract

The article considers the problem of fast actions. This problem will have a starting point. In this case, the integral can be clearly expressed. Therefore, the expression under the integral decomposes into a uniform asymptotic series. To obtain this expansion, we will use the method of consistent expansions. The order of the system is limited to the second degree.

References

Васильева А. Б. Асимптотические методы в теории обыкновенных дифференциальных уравненийс малыми параметрами при старших производных. Журнал вычмслительной математики и математической физики .-М. 1963.

Парышева Ю. В. Асимптотические разложения решений сингулярно возмущенных задач оптимального управления. Дисс. …канд. физ.-мат. наук: 01.01.02. - Екатеринбург. 2012. - 9-92 с.

Токторбаев А. М. Оптималдуу башкаруунун сингулярдык козголгон маселелери Ош мамлекеттик университетинин жарчысы. математика. физика. Техника, Учредители: Ошский государственный университет eISSN: 1694-8645 Ош-2022-23-29с.

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Published

2024-12-10

How to Cite

Toktorbaev , A., & Toktomuratova , Z. (2024). OPTIMAL CONTROL PROBLEM FOR SINGULARLY PERTURBED DIFFERENTIAL EQUATIONS. Journal of Osh State University. Mathematics. Physics. Technical Sciences, (2(5), 191–194. https://doi.org/10.52754/16948645_2024_2(5)_23

Issue

No. 2(5) (2024): BULLETIN OF OSH STATE UNIVERSITY MATHEMATICS. PHYSICS. TECHNOLOGY.

Section

MATHEMATICS

License

Copyright (c) 2024 Journal of Osh State University. Mathematics. Physics. Technical Sciences

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