Practical stability of hybrid systems

Lyapunov's second method is widely recognized as a fundamental tool not only in the theory of stability but also in studying other qualitative properties of solutions of differential equations. The main characteristic of this method is the utilization of a function, namely the Lyapunov function, tog

## ARSTRACIY Theorems are stated and proved fhat provide necessuty and sufficient conditions for practical stability of discrete-time systems. The first part of the paper deals with stability and instability with respect to time-uarying sets, whereas the second part is devoted to the study of fina

This note analyses the problem of stability of hybrid simulation of dynamic systems. Time delays and sample-and-hold operations do cause serious stability problems, and it frequently happens that considerable time and effort are wasted because instability is not known in advance of programming the s

Practical stability is neither weaker nor stronger than Lyapunov stability, and practical stability of discontinuous large-scale systems has been rarely studied to date. In this paper practical stability of discontinuous large-scale systems with various decomposition forms is discussed, and some app