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Auteurs principaux: Wang, Xiaolong, Xu, Kejia
Format: Preprint
Publié: 2024
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Accès en ligne:https://arxiv.org/abs/2406.03967
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author Wang, Xiaolong
Xu, Kejia
author_facet Wang, Xiaolong
Xu, Kejia
contents We propose two kinds of model order reduction methods for discrete time-delay systems with inhomogeneous initial conditions. The peculiar properties of discrete Walsh functions are directly utilized to compute the Walsh coefficients of the systems, and the projection matrix is defined properly to generate reduced models by taking into account the non-zero initial conditions. It is shown that reduced models can preserve some Walsh coefficients of the expansion of the original systems. Further, the superposition principle is exploited to achieve a decomposition of the original systems, and a new definition of Gramians is proposed by combining the individual Gramians of each subsystem. As a result, the balanced truncation method is applied to systems with inhomogeneous initial conditions. We also provide a low-rank approximation to Gramians based on the discrete Laguerre polynomials, which enables an efficient execution of our approach. Numerical examples confirm the feasibility and effectiveness of the proposed methods.
format Preprint
id arxiv_https___arxiv_org_abs_2406_03967
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Model order reduction for discrete time-delay systems with inhomogeneous initial conditions
Wang, Xiaolong
Xu, Kejia
Optimization and Control
We propose two kinds of model order reduction methods for discrete time-delay systems with inhomogeneous initial conditions. The peculiar properties of discrete Walsh functions are directly utilized to compute the Walsh coefficients of the systems, and the projection matrix is defined properly to generate reduced models by taking into account the non-zero initial conditions. It is shown that reduced models can preserve some Walsh coefficients of the expansion of the original systems. Further, the superposition principle is exploited to achieve a decomposition of the original systems, and a new definition of Gramians is proposed by combining the individual Gramians of each subsystem. As a result, the balanced truncation method is applied to systems with inhomogeneous initial conditions. We also provide a low-rank approximation to Gramians based on the discrete Laguerre polynomials, which enables an efficient execution of our approach. Numerical examples confirm the feasibility and effectiveness of the proposed methods.
title Model order reduction for discrete time-delay systems with inhomogeneous initial conditions
topic Optimization and Control
url https://arxiv.org/abs/2406.03967