Common Polynomial Lyapunov Functions for Linear Switched Systems

Abstract

In this paper, we consider linear switched systems x(t)=Au(t) x(t), x∈n, u∈ U, and the problem of asymptotic stability for arbitrary switching functions, uniform with respect to switching ( UAS for short). We first prove that, given a UAS system, it is always possible to build a common polynomial Lyapunov function. Then our main result is that the degree of that common polynomial Lyapunov function is not uniformly bounded over all the UAS systems. This result answers a question raised by Dayawansa and Martin. A generalization to a class of piecewise-polynomial Lyapunov functions is given.

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