Mathematical Model of Control of a Hydrodynamic Object with Distributed Parameters
DOI:
https://doi.org/10.17605/OSF.IO/ZXVUCKeywords:
optimal control, mathematical model, a system with distributed parameters, the maximum principle, the status of pumps, amplitude, frequencyAbstract
The article presents a mathematical model applied optimal control of the hydrodynamic facility with distributed parameters. The theorem on the number of switching pumps flooding in the translation object with lumped parameters from the initial to the final state.
References
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2. Suvonov O.O. On one problem of apriorious evaluation for a hydrodynamic system with distributed parameters. Electronic journal of actual problems of modern science, education and training. june, 2020-III. ISSN 2181-9750 http://khorezmscience.uz 231 udc 62-50: 622.276
3. Suvonov O.O., Nazirova E.Sh. Mathematical modeling of the unctioning of a hydrodynamic system with distributed parameters. Bulletin of TUIT: Management and Communication Technologies. 5-23-2021 UDK 62-50:276.681
4. Suvonov O.O., Kuchkarova S.S. “Computational Experiment of Numerical Study of Hydrodynamic Processes in Interacting Formations”. Cite as: AIP Conference Proceedings 2365, 010001 (2021); https://doi.org/10.1063/12.0005080 Published Online: 16 July 2021 About AIP Publishing. Scopus.
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2. Suvonov O.O. On one problem of apriorious evaluation for a hydrodynamic system with distributed parameters. Electronic journal of actual problems of modern science, education and training. june, 2020-III. ISSN 2181-9750 http://khorezmscience.uz 231 udc 62-50: 622.276
3. Suvonov O.O., Nazirova E.Sh. Mathematical modeling of the unctioning of a hydrodynamic system with distributed parameters. Bulletin of TUIT: Management and Communication Technologies. 5-23-2021 UDK 62-50:276.681
4. Suvonov O.O., Kuchkarova S.S. “Computational Experiment of Numerical Study of Hydrodynamic Processes in Interacting Formations”. Cite as: AIP Conference Proceedings 2365, 010001 (2021); https://doi.org/10.1063/12.0005080 Published Online: 16 July 2021 About AIP Publishing. Scopus.
5. Henry B. Crichlow Modern oilfield development - modeling problems. Per. from English. M.: Nedra. 1979, 3034 p. – Per.ed. USA, 1977.
6. Samarsky A.A. Theory of difference schemes. M.: Nauka, 1977, 656 p.
7. Bochkareva T.B. Optimal control of water pumping processes. Izv. Universities. - Baku: Oil and Gas, 1984, № 4.
8. Boltyansky V.G. Mathematical methods of optimal control. - M.: Nauka, 1969. - 408 p.
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Published
2022-04-11
How to Cite
Omonovich, S. O. . (2022). Mathematical Model of Control of a Hydrodynamic Object with Distributed Parameters . CENTRAL ASIAN JOURNAL OF MATHEMATICAL THEORY AND COMPUTER SCIENCES, 3(4), 69–73. https://doi.org/10.17605/OSF.IO/ZXVUC
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