1) Riccati iteration
Riccati迭代
1.
For linear part the control law with Riccati iteration matrices satisfying certain conditions is used to get the Lyapunov function.
对线性部分采用Riccati迭代矩阵满足一定条件的控制律以得到Lyapunov函数 ,进而研究了存在非线性反算误差 (由非线性方程求解误差和解饱和算法形成 )时两步法使系统保持稳定的条件 ,给出了实际系统参数调整的指导方法 。
2) iterated solution of Riccati equation
Riccati 方程迭代解
3) algebraic Riccati equation
代数Riccati方程
1.
A robust H-infinity control scheme of output feedback based on an algebraic Riccati equation was presented to stabilize the closed loop system.
基于代数Riccati方程方法,提出了H∞鲁棒输出反馈控制方法,以使系统闭环控制稳定。
2.
By means of the positive-definite solutions of algebraic Riccati equations,the robust H ∞ dynamic output feed-back controller is constructed,under which the closed-loop systems are of internal stability and reduce the H ∞ norm of the trans-fer function from the disturbance to the controlled output to a prescribed level for all admissible uncertainties and all positi.
通过代数Riccati方程的正定解,给出了全维鲁棒H∞动态输出反馈控制器的设计,使得相应的闭环系统对一切时滞和所有允许不确定参数保持内稳定,并且闭环系统从扰动受控输出之间传递函数H∞范数不大于已知给定的指标值。
3.
In a large multihop sensor network,the controllers and the plants usually communicate via unreliable wireless channels,and the algebraic Riccati equation is modified because of the random packet losses.
在传感器网络中,控制器与被控对象通过不可靠无线网络通信,因此代数Riccati方程由于通信链路的随机丢包产生了新的参数。
4) Riccati algebraic equation
Riccati代数方程
5) algebraic Riccati equations
代数Riccati方程
1.
The solution to local controllers is carried out merely by iteratively solving a set of local algebraic Riccati equations.
局部控制器的求解只需递推地利用一系列局部代数Riccati方程 。
6) classical Riccati algebraic equations
常规Riccati代数方程
补充资料:层层迭迭
1.见"层层迭迭"。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条