Application of optimal polynomial controller to a benchmark problem
學年 87
學期 1
出版(發表)日期 1998-11-01
作品名稱 Application of optimal polynomial controller to a benchmark problem
作品名稱(其他語言)
著者 Agrawal, A. K.; Yang, J. N.; 吳重成; Wu, Jong-cheng
單位 淡江大學土木工程學系
出版者 Wiley-Blackwell
著錄名稱、卷期、頁數 Earthquake engineering and structural dynamics 27(11), pp.1291-1302
摘要 In this paper, we investigate the performance of optimal polynomial control for the vibration suppression of a benchmark problem; namely, the active tendon system. The optimal polynomial controller is a summation of polynomials of different orders, i.e., linear, cubic, quintic, etc., and the gain matrices for different parts of the controller are calculated easily by solving matrix Riccati and Lyapunov equations. A Kalman–Bucy estimator is designed for the on-line estimation of the states of the design model. Hence, the Linear Quadratic Gaussian (LQG) controller is a special case of the current polynomial controller in which the higher-order parts are zero. While the percentage of reduction for displacement response quantities remains constant for the LQG controller, it increases with respect to the earthquake intensity for the polynomial controller. Consequently, if the earthquake intensity exceeds the design one, the polynomial controller is capable of achieving a higher reduction for the displacement response at the expense of control efforts. Such a property is desirable for the protection of civil engineering structures because of the inherent stochastic nature of the earthquake.
關鍵字
語言 en
ISSN 0098-8847
期刊性質 國內
收錄於
產學合作
通訊作者
審稿制度
國別 TWN
公開徵稿
出版型式 ,電子版
相關連結

機構典藏連結 ( http://tkuir.lib.tku.edu.tw:8080/dspace/handle/987654321/44831 )

機構典藏連結