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Minimax control in the singularly perturbed linear-quadratic stabilization problem. / Myshkov, S.K.; Karelin, V.V.

2015 International Conference on "Stability and Control Processes" in Memory of V.I. Zubov, SCP 2015 - Proceedings. Institute of Electrical and Electronics Engineers Inc., 2015. стр. 328-331.

Результаты исследований: Публикации в книгах, отчётах, сборниках, трудах конференцийстатья в сборнике материалов конференциинаучная

Harvard

Myshkov, SK & Karelin, VV 2015, Minimax control in the singularly perturbed linear-quadratic stabilization problem. в 2015 International Conference on "Stability and Control Processes" in Memory of V.I. Zubov, SCP 2015 - Proceedings. Institute of Electrical and Electronics Engineers Inc., стр. 328-331, III Международная конференция "Устойчивость и процессы управления", посвященная 85-летию со дня рождения чл.-корр. РАН В.И. Зубова, St. Petersburg, Российская Федерация, 5/10/15. https://doi.org/10.1109/SCP.2015.7342130

APA

Myshkov, S. K., & Karelin, V. V. (2015). Minimax control in the singularly perturbed linear-quadratic stabilization problem. в 2015 International Conference on "Stability and Control Processes" in Memory of V.I. Zubov, SCP 2015 - Proceedings (стр. 328-331). Institute of Electrical and Electronics Engineers Inc.. https://doi.org/10.1109/SCP.2015.7342130

Vancouver

Myshkov SK, Karelin VV. Minimax control in the singularly perturbed linear-quadratic stabilization problem. в 2015 International Conference on "Stability and Control Processes" in Memory of V.I. Zubov, SCP 2015 - Proceedings. Institute of Electrical and Electronics Engineers Inc. 2015. стр. 328-331 https://doi.org/10.1109/SCP.2015.7342130

Author

Myshkov, S.K. ; Karelin, V.V. / Minimax control in the singularly perturbed linear-quadratic stabilization problem. 2015 International Conference on "Stability and Control Processes" in Memory of V.I. Zubov, SCP 2015 - Proceedings. Institute of Electrical and Electronics Engineers Inc., 2015. стр. 328-331

BibTeX

@inproceedings{a66004d05cfc4d22a5dac3c377418111,
title = "Minimax control in the singularly perturbed linear-quadratic stabilization problem",
abstract = "{\textcopyright} 2015 IEEE. 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 the report and previous works is in the presence of regular and singular perturbations in the dynamics.",
keywords = "discrete systems, feedback, linear quadratic control, minimax techniques, singularly perturbed systems, stability, discrete minimax problem, minimax control, output feedback stabilization problem, singularly perturbed linear-quadratic stabilization problem, Eigenvalues and eigenfunctions, Kalman filters, Observers, Optimal control, Output feedback, Regulators",
author = "S.K. Myshkov and V.V. Karelin",
year = "2015",
doi = "10.1109/SCP.2015.7342130",
language = "English",
isbn = "9781467376983",
pages = "328--331",
booktitle = "2015 International Conference on {"}Stability and Control Processes{"} in Memory of V.I. Zubov, SCP 2015 - Proceedings",
publisher = "Institute of Electrical and Electronics Engineers Inc.",
address = "United States",
note = "International Conference on {"}Stability and Control Processes{"} in Memory of V.I. Zubov, SCP 2015 ; Conference date: 05-10-2015 Through 09-10-2015",
url = "http://www.apmath.spbu.ru/scp2015/openconf.php",

}

RIS

TY - GEN

T1 - Minimax control in the singularly perturbed linear-quadratic stabilization problem

AU - Myshkov, S.K.

AU - Karelin, V.V.

PY - 2015

Y1 - 2015

N2 - © 2015 IEEE. 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 the report and previous works is in the presence of regular and singular perturbations in the dynamics.

AB - © 2015 IEEE. 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 the report and previous works is in the presence of regular and singular perturbations in the dynamics.

KW - discrete systems

KW - feedback

KW - linear quadratic control

KW - minimax techniques

KW - singularly perturbed systems

KW - stability

KW - discrete minimax problem

KW - minimax control

KW - output feedback stabilization problem

KW - singularly perturbed linear-quadratic stabilization problem

KW - Eigenvalues and eigenfunctions

KW - Kalman filters

KW - Observers

KW - Optimal control

KW - Output feedback

KW - Regulators

U2 - 10.1109/SCP.2015.7342130

DO - 10.1109/SCP.2015.7342130

M3 - Conference contribution

SN - 9781467376983

SP - 328

EP - 331

BT - 2015 International Conference on "Stability and Control Processes" in Memory of V.I. Zubov, SCP 2015 - Proceedings

PB - Institute of Electrical and Electronics Engineers Inc.

T2 - International Conference on "Stability and Control Processes" in Memory of V.I. Zubov, SCP 2015

Y2 - 5 October 2015 through 9 October 2015

ER -

ID: 3988320