Title :
Rank reduction for matrix pair and its application in singular systems
Author :
Wang, Jing ; Liu, Wanquan ; Zhang, QingLing ; Liu, Xiaodong
Author_Institution :
Inst. of Syst. Sci., Northeasten Univ., China
Abstract :
In this paper, the rank reduction problem for a rectangle matrix pair is investigated. First, the rank reduction problem is defined and it is solved via an algebraic approach. In fact, the proposed method is a procedure for getting the maximal value for the uncertain parameter such that the rank of the perturbed matrix will remain the same. Based on the results, the maximal robust stability radius problem of singular systems has been solved completely. Finally, three examples are used to illustrate the effectiveness of the proposed approach.
Keywords :
matrix algebra; singularly perturbed systems; maximal robust stability radius problem; perturbed matrix; rank reduction problem; rectangle matrix pair; singular systems; Artificial intelligence; Control systems; Mathematics; Physics; Process control; Robust control; Robust stability; Signal processing; State-space methods;
Conference_Titel :
Control Conference, 2004. 5th Asian
Conference_Location :
Melbourne, Victoria, Australia
Print_ISBN :
0-7803-8873-9
