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Details for article 5 of 7 found articles
| Title: |
Numerically robust pole assignment for second-order systems |
| Author: |
Chu, E. K. Datta, B. N. |
| Appeared in: |
International journal of control |
| Paging: | Volume 64 (1996) nr. 6 pages 1113-1127 |
| Year: |
1996-08-01 |
| Contents: |
We propose two new methods for solution of the eigenvalue assignment problem associated with the second-order control system \global\hsize=30pc [image omitted] [image omitted] Specifically, the methods construct feedback matrices F1 and F2 such that the closed-loop quadratic pencil has a desired set of eigenvalues and the associated eigenvectors are well conditioned. Method 1 is a modification of the singular value decomposition-based method proposed by Juang and Maghami which is a second-order adaptation of the well-known robust eigenvalue assignment method by Kautsky et al. for first-order systems. Method 2 is an extension of the recent non-modal approach of Datta and Rincon for feedback stabilization of second-order systems. Robustness to numerical round-off errors is achieved by minimizing the condition numbers of the eigenvectors of the closed-loop second-order pencil. Control robustness to large plant uncertainty will not be explicitly considered in this paper. Numerical results for both the two methods are favourable. A comparative study of the methods is included in the paper. |
| Publisher: |
Taylor & Francis |
| Source file: |
Elektronische Wetenschappelijke Tijdschriften |
Details for article 5 of 7 found articles
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