加权
椭球体
控制理论(社会学)
线性矩阵不等式
数学
约束(计算机辅助设计)
基质(化学分析)
地平线
数学优化
约束优化
终端(电信)
不变(物理)
最优化问题
模型预测控制
计算机科学
控制(管理)
材料科学
放射科
复合材料
人工智能
天文
物理
电信
医学
数学物理
几何学
作者
Jae‐Won Lee,Wook Hyun Кwon,Jinhoon Choi
标识
DOI:10.23919/ecc.1997.7082112
摘要
In this paper, a new stabilizing receding horizon control, based on a finite input and state horizon cost with a finite terminal weighting matrix, is proposed for time-varying discrete linear systems with constraints. We propose matrix inequality conditions on the terminal weighting matrix under which closed loop stability is guaranteed for both cases of unconstrained and constrained systems with input and state constraints. We show that such a terminal weighting matrix can be obtained by solving an LMI (Linear Matrix Inequality). In the case of constrained time-invariant systems, an artificial invariant ellipsoid constraint is introduced in order to relax the conventional terminal equality constraint and to handle constraints. Using the invariant ellipsoid constraints, a feasibility condition of the optimization problem, is presented and a region of attraction is characterized for constrained systems with the proposed receding horizon control.
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