High-order Krylov subspace model order reduction methods for bilinear time-delay systems

High-order Krylov subspace model order reduction methods for bilinear time-delay systems

Model order reduction methods via high-order Krylov subspace for bilinear time-delay systems are developed in this paper. The proposed methods are based on the expansion of the Taylor series or Laguerre series. The obtained reduced systems can not only match certain expansion coefficients but also p...

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Bibliographic Details
Published in:Systems & control letters Vol. 186; p. 105764
Main Authors: Cheng, Gao-Yuan, Miao, Zhen, Jiang, Yao-Lin
Format: Journal Article
Language:English
Published: Elsevier B.V 01-04-2024
Subjects:
Bilinear time-delay systems
High-order Krylov subspace
Laguerre polynomials
Model order reduction
Moment matching
High-order Krylov subspace
Model order reduction
Moment matching
Laguerre polynomials
Bilinear time-delay systems
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Summary:Model order reduction methods via high-order Krylov subspace for bilinear time-delay systems are developed in this paper. The proposed methods are based on the expansion of the Taylor series or Laguerre series. The obtained reduced systems can not only match certain expansion coefficients but also preserve the structure of the original system. We also briefly discuss the two-sided projection reduction method. To address the implementation of our approach, we utilize the high-order block Arnoldi algorithm to generate projection matrices and employ the genetic algorithm to optimize parameter selection during the reduction process. Finally, we validate the performance of the proposed reduction methods through numerical results.
ISSN:0167-6911
1872-7956
DOI:10.1016/j.sysconle.2024.105764