Abstract
The computation of dominant eigenvalues of second-order linear control systems with multiple time-delays is tackled by using a contour integral method. The proposed approach depends on a reduced characteristic function and the associated characteristic matrix comprised of measured open-loop receptances. This reduced characteristic function is derived from the original characteristic function of the second-order time delayed systems based on the reasonable assumption that eigenvalues of the closed-loop system are distinct from those of the open-loop system, and has the same eigenvalues as those of the original. Then, the eigenvalues computation is equivalent to solve a nonlinear eigenvalue problem of the associated characteristic matrix by using a contour integral method. The proposed approach also utilizes the spectrum distribution features of the retarded time-delay systems. Finally, numerical examples are given to illustrate the effectiveness of the proposed approach.
Highlights
Integral MethodJun-Shen Yang 1 , Huajiang Ouyang 2 , Jia-Fan Zhang 1,3, * , Ke-Wei Zhang 1,3 , Zhi-Gang Hu 1,3 and Hai-Min Liu 1
Many mechanical and structural systems under active vibration control can be described as linear time-delayed systems (TDSs) due to sensing and actuation delays
This paper addresses the computation of dominant eigenvalues for second-order systems with multiple constant time-delays using a contour integral method
Summary
Jun-Shen Yang 1 , Huajiang Ouyang 2 , Jia-Fan Zhang 1,3, * , Ke-Wei Zhang 1,3 , Zhi-Gang Hu 1,3 and Hai-Min Liu 1. Hubei Provincial Engineering Technology Research Center of Fish Processing Equipment, Wuhan 430023, China. Received: 26 October 2019; Accepted: 29 November 2019; Published: 3 December 2019
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