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Algebraical aspects of parametrical decomposition method. / Kamachkin, A.M.; Chitrov, G.M.; Shamberov, V.N.

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. p. 52-54.

Research output: Chapter in Book/Report/Conference proceedingConference contribution

Harvard

Kamachkin, AM, Chitrov, GM & Shamberov, VN 2015, Algebraical aspects of parametrical decomposition method. in 2015 International Conference on "Stability and Control Processes" in Memory of V.I. Zubov, SCP 2015 - Proceedings. Institute of Electrical and Electronics Engineers Inc., pp. 52-54. https://doi.org/10.1109/SCP.2015.7342056, https://doi.org/10.1109/scp.2015.7342056

APA

Kamachkin, A. M., Chitrov, G. M., & Shamberov, V. N. (2015). Algebraical aspects of parametrical decomposition method. In 2015 International Conference on "Stability and Control Processes" in Memory of V.I. Zubov, SCP 2015 - Proceedings (pp. 52-54). Institute of Electrical and Electronics Engineers Inc.. https://doi.org/10.1109/SCP.2015.7342056, https://doi.org/10.1109/scp.2015.7342056

Vancouver

Kamachkin AM, Chitrov GM, Shamberov VN. Algebraical aspects of parametrical decomposition method. In 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. p. 52-54 https://doi.org/10.1109/SCP.2015.7342056, https://doi.org/10.1109/scp.2015.7342056

Author

Kamachkin, A.M. ; Chitrov, G.M. ; Shamberov, V.N. / Algebraical aspects of parametrical decomposition method. 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. pp. 52-54

BibTeX

@inproceedings{4bbc59ad7f98413c8107e3bee913b959,
title = "Algebraical aspects of parametrical decomposition method",
abstract = "{\textcopyright} 2015 IEEE.The paper focuses on the approach based on precise analytical methods of research for nonlinear dynamical systems with a complex structure of the state space. This method allows to analyze behavior of essentially multivariable systems through the dynamic behavior of its basic components, i.e., subsystems (both linear and nonlinear), that have a reduced order state-space. Such approach allows to bring out strict proof of existence of free and forced periodical motions. In most cases the approach allows to complete 'partition' of the space of parameters into areas corresponding to qualitatively different dynamic behaviors.",
author = "A.M. Kamachkin and G.M. Chitrov and V.N. Shamberov",
year = "2015",
doi = "10.1109/SCP.2015.7342056",
language = "English",
isbn = "9781467376983",
pages = "52--54",
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",

}

RIS

TY - GEN

T1 - Algebraical aspects of parametrical decomposition method

AU - Kamachkin, A.M.

AU - Chitrov, G.M.

AU - Shamberov, V.N.

PY - 2015

Y1 - 2015

N2 - © 2015 IEEE.The paper focuses on the approach based on precise analytical methods of research for nonlinear dynamical systems with a complex structure of the state space. This method allows to analyze behavior of essentially multivariable systems through the dynamic behavior of its basic components, i.e., subsystems (both linear and nonlinear), that have a reduced order state-space. Such approach allows to bring out strict proof of existence of free and forced periodical motions. In most cases the approach allows to complete 'partition' of the space of parameters into areas corresponding to qualitatively different dynamic behaviors.

AB - © 2015 IEEE.The paper focuses on the approach based on precise analytical methods of research for nonlinear dynamical systems with a complex structure of the state space. This method allows to analyze behavior of essentially multivariable systems through the dynamic behavior of its basic components, i.e., subsystems (both linear and nonlinear), that have a reduced order state-space. Such approach allows to bring out strict proof of existence of free and forced periodical motions. In most cases the approach allows to complete 'partition' of the space of parameters into areas corresponding to qualitatively different dynamic behaviors.

U2 - 10.1109/SCP.2015.7342056

DO - 10.1109/SCP.2015.7342056

M3 - Conference contribution

SN - 9781467376983

SP - 52

EP - 54

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.

ER -

ID: 4003997