Control of a many equilibria hyperchaotic system
作者: Jay Prakash Singh , Binoy Krishna Roy
DOI: 10.1109/INDIANCC.2017.7846519
关键词: Sliding mode control 、 Adaptive system 、 System dynamics 、 Control theory 、 Constant (mathematics) 、 Control (management) 、 Synchronization 、 Engineering
摘要: This paper presents a control technique for many equilibria hyperchaotic system. Controlling system is challenging task. An adaptive proportional integral SMC proposed controlling of In the technique, sliding surfaces are designed with unknown constant gains. Although there four states but only two inputs used regulating to zero. The parameters estimated. It shown that achieved in presence and gains surfaces.
sci-hub.se 参考文章(23)
J.C. Sprott, Sajad Jafari, Viet-Thanh Pham, Zahra Sadat Hosseini, A chaotic system with a single unstable node Physics Letters A. ,vol. 379, pp. 2030- 2036 ,(2015) , 10.1016/J.PHYSLETA.2015.06.039
Chao-Chung Peng, Chieh-Li Chen, Robust chaotic control of Lorenz system by backstepping design Chaos, Solitons & Fractals. ,vol. 37, pp. 598- 608 ,(2008) , 10.1016/J.CHAOS.2006.09.057
Jay Prakash Singh, Piyush Pratap Singh, BK Roy, None, Synchronization between hyperchaotic systems using PI Based Sliding Mode Control international conference on communications. pp. 424- 428 ,(2014) , 10.1109/ICCSP.2014.6949876
Wei Xiang, Yugao Huangpu, Second-order terminal sliding mode controller for a class of chaotic systems with unmatched uncertainties Communications in Nonlinear Science and Numerical Simulation. ,vol. 15, pp. 3241- 3247 ,(2010) , 10.1016/J.CNSNS.2009.12.012
Yuming Chen, Qigui Yang, A new Lorenz-type hyperchaotic system with a curve of equilibria Mathematics and Computers in Simulation. ,vol. 112, pp. 40- 55 ,(2015) , 10.1016/J.MATCOM.2014.11.006
Yashar Toopchi, Jidong Wang, Chaos Control and Synchronization of a Hyperchaotic Zhou System by Integral Sliding Mode control Entropy. ,vol. 16, pp. 6539- 6552 ,(2014) , 10.3390/E16126539
Leipo Liu, Jiexin Pu, Xiaona Song, Zhumu Fu, Xiaohong Wang, Adaptive sliding mode control of uncertain chaotic systems with input nonlinearity Nonlinear Dynamics. ,vol. 76, pp. 1857- 1865 ,(2014) , 10.1007/S11071-013-1163-6
Chaowen Shen, Simin Yu, Jinhu Lu, Guanrong Chen, A Systematic Methodology for Constructing Hyperchaotic Systems With Multiple Positive Lyapunov Exponents and Circuit Implementation IEEE Transactions on Circuits and Systems I: Regular Papers. ,vol. 61, pp. 854- 864 ,(2014) , 10.1109/TCSI.2013.2283994
Piyush Pratap Singh, Jay Prakash Singh, BK Roy, None, Synchronization and anti-synchronization of Lu and Bhalekar–Gejji chaotic systems using nonlinear active control Chaos, Solitons & Fractals. ,vol. 69, pp. 31- 39 ,(2014) , 10.1016/J.CHAOS.2014.09.005
Mohammad Pourmahmood Aghababa, Hassan Feizi, Nonsingular terminal sliding mode approach applied to synchronize chaotic systems with unknown parameters and nonlinear inputs Chinese Physics B. ,vol. 21, pp. 060506- ,(2012) , 10.1088/1674-1056/21/6/060506