Abstract
This paper investigates the stabilization problem of fractional order systems with both model uncertainty and external disturbance. By combining the linear feedback control method, the dynamic feedback control method, and the uncertainty and disturbance estimator (UDE)-based control method, respectively, two new UDE-based control methods are developed. Using these methods, the fractional order systems can be stabilized by three steps. In the first step, the linear feedback and dynamic feedback controllers are designed to stabilize the nominal fractional order systems. The second step is to design a UDE-based fractional order controller to estimate the model uncertainty and external disturbance. In the third step, the two controllers are combined into a new controller to realize the stabilization of those fractional order systems. Finally, a numerical example is given to verify the correctness and validity of the proposed methods.
Highlights
Fractional calculus has a history of more than 300 years, its development is slow due to its lack of practical application background
For fractional order systems (FOSs), there are many different kinds of control problems, such as stabilization, synchronization, anti-synchronization, co-existence of synchronization and anti-synchronization, projective synchronization, etc [7]–[19]. Stabilization is the both basic and important problem to be solved for FOSs
When the stabilization problem is solved can the other types of control problems be settled
Summary
Fractional calculus has a history of more than 300 years, its development is slow due to its lack of practical application background. Fractional order systems (FOSs) can perform well in some practical problems, and many systems in reality have fractional order dynamic behavior, so the research on FOSs develops rapidly. For FOSs, there are many different kinds of control problems, such as stabilization, synchronization, anti-synchronization, co-existence of synchronization and anti-synchronization, projective synchronization, etc [7]–[19]. Among these control problems, stabilization is the both basic and important problem to be solved for FOSs. Only when the stabilization problem is solved can the other types of control problems be settled. It is very important to study the stabilization problem of FOSs
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