Sciweavers

HYBRID
2009
Springer

Stabilization of Discrete-Time Switched Linear Systems: A Control-Lyapunov Function Approach

14 years 4 months ago
Stabilization of Discrete-Time Switched Linear Systems: A Control-Lyapunov Function Approach
This paper studies the exponential stabilization problem for discrete-time switched linear systems based on a control-Lyapunov function approach. A number of versions of converse control-Lyapunov function theorems are proved and their connections to the switched LQR problem are derived. It is shown that the system is exponentially stabilizable if and only if there exists a finite integer N such that the N-horizon value function of the switched LQR problem is a control-Lyapunov function. An efficient algorithm is also proposed which is guaranteed to yield a control-Lyapunov function and a stabilizing strategy whenever the system is exponentially stabilizable.
Wei Zhang, Alessandro Abate, Jianghai Hu
Added 25 Jul 2010
Updated 25 Jul 2010
Type Conference
Year 2009
Where HYBRID
Authors Wei Zhang, Alessandro Abate, Jianghai Hu
Comments (0)