Title :
An Efficient Technique for Computing a Sub-optimal Disturbance Attenuation $H_{infty}$ Control Problem Feedback Solution
Author :
Freitas, Francisco Damasceno ; Ishihara, João Yoshiyuki ; de Araujo Borges, G.
Author_Institution :
Dept. of Electr. Eng., Univ. of Brasilia, Brasilia
Abstract :
This paper presents a technique to determine the optimal Hinfin state-feedback control gain. This gain leads to a closed loop system with the best level of disturbance attenuation. The proposed method uses convergence characteristics of the bisection method and iterative solutions of algebraic Riccati equations (AREs). The numerical instability monitoring of the AREs and Lyapunov equation solutions are used as a tool to adjust the level of disturbance attenuation. The technique uses the fact that Lyapunov equation solutions can present low-rank characteristics and that numerical aspects, such as products involving inverse of matrices, can be efficiently implemented. Tests carried out on three dynamic systems, including one of 3078 states, demonstrate the efficiency of the proposed method.
Keywords :
Hinfin control; Lyapunov matrix equations; Riccati equations; closed loop systems; iterative methods; nonlinear control systems; numerical stability; state feedback; suboptimal control; Lyapunov equation solution; algebraic Riccati equations; bisection method; closed loop system; iterative solutions; numerical instability monitoring; optimal Hinfin state-feedback control gain; suboptimal disturbance attenuation Hinfin control problem; Attenuation; Control systems; Feedback; Large-scale systems; Optimal control; Power system dynamics; Power system modeling; Power system simulation; Riccati equations; Robust control; Kleiman method; Riccati equation. Lyapunov equation; Smith method; bisection; optimal control;
Conference_Titel :
Computational Science and Engineering, 2008. CSE '08. 11th IEEE International Conference on
Conference_Location :
Sao Paulo
Print_ISBN :
978-0-7695-3193-9
DOI :
10.1109/CSE.2008.52
