Passive control of chaotic oscillation in interconnected two-machine power system
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- 英文论文题名:Passive control of chaotic oscillation in interconnected two-machine power system
- 论文作者:Darui Zhu ; Rui Wang ; Wenchao Zhang ; Jiandong Duan
- 英文论文作者:Darui Zhu ; Rui Wang ; Wenchao Zhang ; Jiandong Duan ; School of Automation and Information Engineering ; Xi'an University of Technology ; School of Water Conservancy and Hydro-Electric Power ; Xi'an University of Technology
- 年:2017
- 作者机构:School of Automation and Information Engineering,Xi'an University of Technology;School of Water Conservancy and Hydro-Electric Power,Xi'an University of Technology;
- 英文论文关键词:Power system ; chaotic oscillation ; bifurcation ; passive control
- 会议召开时间:2017-07-26
- 会议录名称:第36届中国控制会议论文集(A)
- 英文会议录名称:Proceedings of the 36th Chinese Control Conference(A)
- 语种:英文
- 分类号:O231;O415.5
- 学会代码:KZLL
- 会议名称:第36届中国控制会议
- 会议地点:中国辽宁大连
- 主办单位:中国自动化学会控制理论专业委员会
- 学会名称:中国自动化学会控制理论专业委员会
- 页数:6
- 文件大小:549k
- 原文格式:D
- 会议级别:全国
摘要
By analyzing the chaotic oscillation of the power system, the second-order mathematical model is obtained by simplifying the interconnected two-machine power system model. The nonlinear behavior of the system is analyzed by three aspects, such as: the phase diagram, Lyapunov exponent and bifurcation diagram. Based on passive control theory of nonlinear system, the passive controller is designed which makes the system is passivity and maintaining internal stability for achieving the control of the chaotic system. In numerical simulations, the designed passive controller is added to the chaotic oscillation system at t=30s. The simulation results show that the system is stabilized to its equilibrium point and verified the correctness of the theoretical analysis.
By analyzing the chaotic oscillation of the power system, the second-order mathematical model is obtained by simplifying the interconnected two-machine power system model. The nonlinear behavior of the system is analyzed by three aspects, such as: the phase diagram, Lyapunov exponent and bifurcation diagram. Based on passive control theory of nonlinear system, the passive controller is designed which makes the system is passivity and maintaining internal stability for achieving the control of the chaotic system. In numerical simulations, the designed passive controller is added to the chaotic oscillation system at t=30s. The simulation results show that the system is stabilized to its equilibrium point and verified the correctness of the theoretical analysis.
By analyzing the chaotic oscillation of the power system, the second-order mathematical model is obtained by simplifying the interconnected two-machine power system model. The nonlinear behavior of the system is analyzed by three aspects, such as: the phase diagram, Lyapunov exponent and bifurcation diagram. Based on passive control theory of nonlinear system, the passive controller is designed which makes the system is passivity and maintaining internal stability for achieving the control of the chaotic system. In numerical simulations, the designed passive controller is added to the chaotic oscillation system at t=30s. The simulation results show that the system is stabilized to its equilibrium point and verified the correctness of the theoretical analysis.
引文
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[4]H Wang,Y Li,Y Zhang and C Dong,Chaotic Oscillation Control Based on Adaptive Terminal Sliding Mode,Proceeding of the CSO-EPSA,25(3):152-157,2013
[5]W Huang,F Min,Z Wang and Z Chu,Chaotic oscillation suppression of the interconnected power system based on the adaptive back-stepping sliding mode controller,IEEE Conference Publication,463-467,2015
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[7]L Cao,Z Liang and J Gao,Solution of the interconnected power system based on Adomian decomposition method and its chaotic characteristic analysis,Electrical Measurement&Instrumentation,53(21):22-27,2016
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[14]D.Zhu,C Liu and B Yan,Control and synchronization of a hyperchaotic system based on passive control,Chinese Physics b,21:090509,2012.
[15]F.Wang and C Liu,Synchronization of hyperchaotic Lorenz system based on passive control,Chinese Physics,15(9):1971-1975,2006.
[2]S Dong,H Bao and Z Wei,Calculations and Simulations of the Chaotic Oscillation Threshold in Daul-unit Systems,Proceeding of the CSEE,30(19):58-63,2010
[3]H Zhao,D Fan,Y Yue and H Wang,Generation mechanism of chaotic oscillation of a class of nonlinear power system,Chinese Journal of Power Sources,39(8):1755-1757,2015
[4]H Wang,Y Li,Y Zhang and C Dong,Chaotic Oscillation Control Based on Adaptive Terminal Sliding Mode,Proceeding of the CSO-EPSA,25(3):152-157,2013
[5]W Huang,F Min,Z Wang and Z Chu,Chaotic oscillation suppression of the interconnected power system based on the adaptive back-stepping sliding mode controller,IEEE Conference Publication,463-467,2015
[6]L Yuan,K Wei,B Hu and N Wang,Nonsingular terminal sliding-mode controller with nonlinear disturbance observer for chaotic oscillation in power system,IEEE Conference Publication,3316-3320,2016
[7]L Cao,Z Liang and J Gao,Solution of the interconnected power system based on Adomian decomposition method and its chaotic characteristic analysis,Electrical Measurement&Instrumentation,53(21):22-27,2016
[8]D Song,S Jiang,J Hao,A Review of Low Frequency Oscillation Mechanism in Power System Based on Bifurcation and Chaos,East China Electric Power,42(6):1115-1122,2014.
[9]Z Piao,M Liu and X Wu,Research for controlling chaotic dynamic behaviors in the power system,Journal of Shenyang Agricultural University,40(4):497-499,2009.
[10]F Min,M Ma,W Zhai and E Wang,Chaotic control of the interconnected power system based on the relay characteristic function,Acta Phys.Sin.,63(5):050504,2014.
[11]J Li,Y Tan and D Wei,Noise-induced Chaotic Oscillation Motion in Power,Guangxi Physics,33(4):40-42,2012.
[12]MA Pengfei,LI Hua,YU Mengyang,et al.Control of Chaos in Power System Under Gaussian White Noise.Computer Measurement&Control,2014,22(2):578-580.
[13]W.Yu,Passive equivalence of chaos in Lorenz system,IEEE Transactions on Circuits and Systems I:Fundamental Theory and Application,46(7):876-878,1999.
[14]D.Zhu,C Liu and B Yan,Control and synchronization of a hyperchaotic system based on passive control,Chinese Physics b,21:090509,2012.
[15]F.Wang and C Liu,Synchronization of hyperchaotic Lorenz system based on passive control,Chinese Physics,15(9):1971-1975,2006.