1. Adaptive stabilization for uncertain hyperbolic PDE‐ODE cascade systems.
- Author
-
Li, Xia, Liu, Yungang, Li, Jian, and Man, Yongchao
- Subjects
PROBLEM solving ,CLOSED loop systems ,ADAPTIVE control systems ,GEOGRAPHIC boundaries ,STATE feedback (Feedback control systems) - Abstract
This paper is devoted to the adaptive stabilization for uncertain hyperbolic PDE‐ODE cascade systems. Remarkably, unknown spatially varying and unknown constant parameters exist in the PDE and ODE subsystems, respectively. This brings essential difficulties in the design of compensator and boundary controller, and in the involved performance analysis. To solve the control problem, an infinite‐dimensional backstepping transformation (simplified as IDBT) and its inverse are first introduced to change the original system into a new system (called target system). Then, a state‐feedback boundary controller is constructed for the target system by incorporating the adaptive technique based on projection operator, which can guarantee the desirable stability of the resulting closed‐loop system. Finally, a simulation example is provided to illustrate the effectiveness of the proposed adaptive controller. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
- View/download PDF