Stability of Planar Nonlinear Switched Systems
Abstract
We consider the time-dependent nonlinear system q(t)=u(t)X(q(t))+(1-u(t))Y(q(t)), where q∈2, X and Y are two %C∞ smooth vector fields, globally asymptotically stable at the origin and u:[0,∞)\0,1\ is an arbitrary measurable function. Analysing the topology of the set where X and Y are parallel, we give some sufficient and some necessary conditions for global asymptotic stability, uniform with respect to u(.). Such conditions can be verified without any integration or construction of a Lyapunov function, and they are robust under small perturbations of the vector fields.
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