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Minimax control of a singular perturbed system. / Myshkov, Stanislav K.; Bure, Vladimir M.; Karelin, Vladimir V.; Polyakova, Lyudmila N.

In: Applied Mathematical Sciences, Vol. 10, No. 51, 2016, p. 2497-2504.

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Harvard

Myshkov, SK, Bure, VM, Karelin, VV & Polyakova, LN 2016, 'Minimax control of a singular perturbed system', Applied Mathematical Sciences, vol. 10, no. 51, pp. 2497-2504. https://doi.org/10.12988/ams.2016.66185

APA

Myshkov, S. K., Bure, V. M., Karelin, V. V., & Polyakova, L. N. (2016). Minimax control of a singular perturbed system. Applied Mathematical Sciences, 10(51), 2497-2504. https://doi.org/10.12988/ams.2016.66185

Vancouver

Myshkov SK, Bure VM, Karelin VV, Polyakova LN. Minimax control of a singular perturbed system. Applied Mathematical Sciences. 2016;10(51):2497-2504. https://doi.org/10.12988/ams.2016.66185

Author

Myshkov, Stanislav K. ; Bure, Vladimir M. ; Karelin, Vladimir V. ; Polyakova, Lyudmila N. / Minimax control of a singular perturbed system. In: Applied Mathematical Sciences. 2016 ; Vol. 10, No. 51. pp. 2497-2504.

BibTeX

@article{82911f40e3bd42fba6da090bbceee076,
title = "Minimax control of a singular perturbed system",
abstract = "The output feedback stabilization problem is discussed. It is known that the lack of information about states does not permit to design a control which minimizes the quadratic functional for arbitrary initial states. In the paper, the minimax approach is considered and thereby the discrete minimax problem is solved. The main difference between this paper and previous works is in the presence of regular and singular perturbations in the dynamics.",
author = "Myshkov, {Stanislav K.} and Bure, {Vladimir M.} and Karelin, {Vladimir V.} and Polyakova, {Lyudmila N.}",
year = "2016",
doi = "10.12988/ams.2016.66185",
language = "English",
volume = "10",
pages = "2497--2504",
journal = "Applied Mathematical Sciences",
issn = "1312-885X",
publisher = "Hikari Ltd.",
number = "51",

}

RIS

TY - JOUR

T1 - Minimax control of a singular perturbed system

AU - Myshkov, Stanislav K.

AU - Bure, Vladimir M.

AU - Karelin, Vladimir V.

AU - Polyakova, Lyudmila N.

PY - 2016

Y1 - 2016

N2 - The output feedback stabilization problem is discussed. It is known that the lack of information about states does not permit to design a control which minimizes the quadratic functional for arbitrary initial states. In the paper, the minimax approach is considered and thereby the discrete minimax problem is solved. The main difference between this paper and previous works is in the presence of regular and singular perturbations in the dynamics.

AB - The output feedback stabilization problem is discussed. It is known that the lack of information about states does not permit to design a control which minimizes the quadratic functional for arbitrary initial states. In the paper, the minimax approach is considered and thereby the discrete minimax problem is solved. The main difference between this paper and previous works is in the presence of regular and singular perturbations in the dynamics.

U2 - 10.12988/ams.2016.66185

DO - 10.12988/ams.2016.66185

M3 - Article

VL - 10

SP - 2497

EP - 2504

JO - Applied Mathematical Sciences

JF - Applied Mathematical Sciences

SN - 1312-885X

IS - 51

ER -

ID: 7581475