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自动化学报 2002
MAKE A NON-WANDERING POINT PERIODIC AND STABLE BY SMALL CONTROL LAW
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Abstract:
In this paper an important problem in chaos control theory, that is, the possibility of generating a new stable periodic solution by small control law for a dynamical system is discussed. It is proved that a solution with an initial point being non-wandering can become asymptotically stable by small control law. This shows that the popular opinion that small control law is not able to create a new periodic point is untrue.
