Using the maximum value of the system general energy as the control conditions and using proportional system parameter impulse perturbation to control chaos are studied.
研究了采用系统广义能量的最大值作为起控条件,实施正比例系统参数微扰,脉冲控制混沌的方法。
The system under consideration involves state time delay, nonlinear perturbation and parameter uncertainties.
系统包含状态时滞,非线性扰动和参数不确定性。
We advanced the ability of restraining the parameter perturbation and stochastic distribution and improved the robust performance of the controlled system.
提高了受控系统抑制参数摄动和随机扰动的能力,改善了控制系统的鲁棒性。
The system under consideration involves state time delay, nonlinear perturbation and parameter uncertainties.
涉及国家正在考虑的系统时间延迟,非线性扰动和参数不确定性。
The system model contains multiple factors such as time-varying delay, parameter perturbation and nonlinear.
系统模型考虑了时变时滞、参数摄动以及非线性等多重因素。
The numerical simulation verified its feasibility in restraining the flexible appendage vibration, optimizing the maneuver time and promoting the system robustness in parameter Perturbation.
仿真结果表明该策略能成功地抑制柔性附件的振动及减小系统的机动时间,并使系统对参数的摄动具有鲁棒性。
Parameter perturbation bounds for robust stability of the closed loop control system are given.
给出了闭环控制系统保持大范围一致稳定时参数摄动应满足的限度。
Parameter perturbation bounds for robust stability of the closed loop control system are given.
给出了闭环控制系统保持大范围一致稳定时参数摄动应满足的限度。
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