Partial Compensation Problem in Large Scale Systems

Authors

• Pradeep Misra, Wright State University - Main CampusFollow
• Alan Laub, Wright State University
• Vassilis Syrmos, Wright State University

Document Type

Conference Proceeding

Publication Date

1-1-1997

Abstract

This paper addresses the problem of partial state feedback compensation for large scale systems. It is desired that the eigenvalues of the closed loop state matrix lie in a specified region of the complex plane satisfying prescribed damping and stability margin. Only those eigenvalues of the state matrix are affected which do not lie in the desired region. This is achieved by block upper triangular decomposition of the state matrix. To decompose the system without having to compute the eigenvalues of the state matrix, matrix sector functions are used.

Repository Citation

Misra, P., Laub, A., & Syrmos, V. (1997). Partial Compensation Problem in Large Scale Systems. Proceedings of the 36th IEEE Conference on Decision and Control, 4, 3873-3877.
https://corescholar.libraries.wright.edu/ee/265

DOI

10.1109/CDC.1997.652466