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Main Author: Kučera, Vladimír
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.23616
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author Kučera, Vladimír
author_facet Kučera, Vladimír
contents This paper addresses the problem of row-by-row (or diagonal) decoupling of discrete-time linear multi-input multi-output systems with periodic time-varying coefficients using periodic state feedback. Previous solutions have tackled row-by-row decoupling using dynamic compensation for square systems and block-decoupling through regular state feedback for nonsquare systems with more outputs than inputs. While it appears likely that a row-by-row state feedback solution for square systems can be deduced from these findings, a direct argument seems more appropriate here as it presents a natural extension for decoupling nonsquare systems with more inputs than outputs. This extension, which necessitates nonregular state feedback, has yet to be explored for periodic systems. Our approach is purely algebraic, based on a time-invariant representation of the periodic system.
format Preprint
id arxiv_https___arxiv_org_abs_2505_23616
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Decoupling Periodic Systems: An Algebraic Approach
Kučera, Vladimír
Systems and Control
Rings and Algebras
93D15 (Primary) 15A54 (Secondary)
I.1.2; F.2.1
This paper addresses the problem of row-by-row (or diagonal) decoupling of discrete-time linear multi-input multi-output systems with periodic time-varying coefficients using periodic state feedback. Previous solutions have tackled row-by-row decoupling using dynamic compensation for square systems and block-decoupling through regular state feedback for nonsquare systems with more outputs than inputs. While it appears likely that a row-by-row state feedback solution for square systems can be deduced from these findings, a direct argument seems more appropriate here as it presents a natural extension for decoupling nonsquare systems with more inputs than outputs. This extension, which necessitates nonregular state feedback, has yet to be explored for periodic systems. Our approach is purely algebraic, based on a time-invariant representation of the periodic system.
title Decoupling Periodic Systems: An Algebraic Approach
topic Systems and Control
Rings and Algebras
93D15 (Primary) 15A54 (Secondary)
I.1.2; F.2.1
url https://arxiv.org/abs/2505.23616