Based on the theory of passive system , we studied the essential conditions , by which chaotic dynamical system was equivalent to passive system . through theoretic proving , we found that using state feedback could make the passive system stable . based on passive equivalence theory , we proved that weakly minimum phase nonlinear system and minimum phase nonlinear system transformed by chaotic system having relative degree 1 could be globally asymptotically stabilized by smooth state feedback 介绍了无源系统的基本性质及其意义,利用无源性网络理论,分析并推导了一般的混饨动力学系统等效为无源系统所必需的基本条件,从理论上证明了无源系统的可控性? ?利用简单的状态反馈即可实现无源系统的稳定控制,从而实现了将最小相位混饨系统及弱最小相位混”饨系统等效为无源系统,即构造混饨系统的控制器,将混饨系统配置为无源系统,实现混饨系统的稳定性控制。
