A novel 3-D jerk chaotic system with three quadratic nonlinearities and its adaptive control

• Main Author: Vaidyanathan Sundarapandian
• Format: Article
• Language: English
• Published: Polish Academy of Sciences 2016-03-01
• Series: Archives of Control Sciences
• Subjects: chaos; chaotic system; dissipative chaotic system; adaptive control; backstepping control; synchronization
• Online Access: http://www.degruyter.com/view/j/acsc.2016.26.issue-1/acsc-2016-0002/acsc-2016-0002.xml?format=INT

This paper announces an eight-term novel 3-D jerk chaotic system with three quadratic nonlinearities. The phase portraits of the novel jerk chaotic system are displayed and the qualitative properties of the jerk system are described. The novel jerk chaotic system has two equilibrium points, which are saddle-foci and unstable. The Lyapunov exponents of the novel jerk chaotic system are obtained as L1 = 0.20572,L2 = 0 and L3 = −1.20824. Since the sum of the Lyapunov exponents of the jerk chaotic system is negative, we conclude that the chaotic system is dissipative. The Kaplan-Yorke dimension of the novel jerk chaotic system is derived as DKY = 2.17026. Next, an adaptive controller is designed via backstepping control method to globally stabilize the novel jerk chaotic system with unknown parameters. Moreover, an adaptive controller is also designed via backstepping control method to achieve global chaos synchronization of the identical jerk chaotic systems with unknown parameters. The backstepping control method is a recursive procedure that links the choice of a Lyapunov function with the design of a controller and guarantees global asymptotic stability of strict feedback systems. MATLAB simulations have been depicted to illustrate the phase portraits of the novel jerk chaotic system and also the adaptive backstepping control results.