On Stability of Switched Discrete-Time Singular Systems
成果类型:
Article
署名作者:
Raj, Phani; Pal, Debasattam
署名单位:
Indian Institute of Technology System (IIT System); Indian Institute of Technology (IIT) - Bombay
刊物名称:
IEEE TRANSACTIONS ON AUTOMATIC CONTROL
ISSN/ISSBN:
0018-9286
DOI:
10.1109/TAC.2024.3396392
发表日期:
2024
页码:
7112-7119
关键词:
Switches
Algebra
Stability criteria
Lyapunov methods
Sufficient conditions
Switched systems
Power system stability
discrete-time systems
Lie algebraic criteria for stability
stability of switched systems
switched singular systems
摘要:
In this article, we prove multiple criteria for the stability of switched discrete-time linear singular (SDLS) systems. First, we show that if the Lie algebra generated by the flow matrices associated with an SDLS system, consisting of stable subsystems, is solvable, then the SDLS system is globally uniformly exponentially stable. Most results in the literature are based on commutativity and the Lie algebraic results of this note generalize the existing results. Furthermore, using the first result, we prove a Lie algebraic criterion involving the system matrices. We also prove a Lyapunov function-based sufficient condition for the exponential stability of SDLS systems and show that this result is equivalent to the existing Lyapunov function-based sufficient condition in the literature. Using this result, we show that an SDLS system with a common descriptor matrix satisfying the Lie algebraic criterion admits a common quadratic Lyapunov function. Finally, we extend the commutativity-based result for SDLS systems involving two subsystems and a common descriptor matrix in the literature to SDLS systems involving finitely many, but arbitrary number of subsystems.