Positive realness is an important concept in system, network and control theory.
正实性问题是系统、网络和控制理论中的一个很重要的概念。
The problem of robust positive realness for continuous singular systems with linear fractional uncertainties is studied.
研究了具有线性分式形不确定性连续广义系统的鲁棒正实性问题。
The paper studies the problem of Robust stabilization of high gain feedback system as that of the realization of Robust positive realness.
本文将高增益反馈系统的鲁棒稳定化问题作为鲁棒正实性实现问题进行研究。
Compared with positive realness, finite frequency positive realness is a new notion, and it also finds some important applications in control theory.
相比于正实性,有限频率正实性则是较近提出的概念,并且亦在控制理论中找到了大量应用。
Equivalence between dissipativeness and positive realness is established, and the necessary and sufficient conditions are derived for discrete-time singular systems to be strict dissipative.
建立了耗散性与正实性之间的等价关系,由此得到离散广义系统严格耗散的充要条件。
To discuss the strictly positive realness judgment criteria of singularly perturbed systems, a singular system model is employed, and the existing positive real lemma of singular systems is improved.
利用广义系统模型,通过改进已有的广义系统正实引理,讨论了奇异摄动系统的正实性判断问题。
Based on stochastic Lyapunov functional approach, both state and output-feedback mode-dependent controllers are proposed to guarantee the strict positive realness of the resulting closed-loop systems.
基于随机李亚普诺夫函数的方法,并结合线性矩阵不等式,分别提出依赖于模态的状态反馈和输出反馈控制,以保证相应闭环系统的严格正实性。
Based on stochastic Lyapunov functional approach, both state and output-feedback mode-dependent controllers are proposed to guarantee the strict positive realness of the resulting closed-loop systems.
基于随机李亚普诺夫函数的方法,并结合线性矩阵不等式,分别提出依赖于模态的状态反馈和输出反馈控制,以保证相应闭环系统的严格正实性。
应用推荐