Finite time stability and sliding mode control for uncertain variable fractional order nonlinear systems
Jingfei Jiang, Hongkui Li, Kun Zhao, Dengqing Cao, Juan L. G. Guirao
Abstract
Abstract This paper deals with the finite time stability and control for a class of uncertain variable fractional order nonlinear systems. The variable fractional Lyapunov direct method is developed to provide the basis for the stability proof of the system considered. The sliding mode control method is applied for robust control of uncertain variable fractional order systems; furthermore, the chattering phenomenon is avoided. And the finite time stability of the systems under control law is proved based on the proposed stability criterion. Finally, numerical simulations are proposed and the efficiency of the controller is verified.
Topics & Concepts
Control theory (sociology)MathematicsVariable structure controlNonlinear systemSliding mode controlStability (learning theory)Variable (mathematics)Controller (irrigation)Lyapunov stabilityFractional-order systemFractional calculusApplied mathematicsControl (management)Mathematical analysisComputer sciencePhysicsBiologyArtificial intelligenceQuantum mechanicsMachine learningAgronomyFractional Differential Equations SolutionsAdvanced Control Systems DesignChaos control and synchronization