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Control of discrete linear repetitive processes using strong practical stability and H? disturbance attenuation

Control of discrete linear repetitive processes using strong practical stability and H? disturbance attenuation
Control of discrete linear repetitive processes using strong practical stability and H? disturbance attenuation
Repetitive processes are a distinct class of 2D systems of both theoretical and practical interest. This paper develops algorithms for control law design to ensure stabilization and a prescribed level of disturbance attenuation as measured by an H? norm.
2d systems control, disturbance attenuation
0167-6911
1138-1144
Dabkowski, Pawel
2137bb50-fd1d-44af-90e2-633709c623c1
Galkowski, Krzysztof
322994ac-7e24-4350-ab72-cc80ac8078ef
Bachelier, Olivier
486fbc42-5417-4ad0-9c42-a39a5e33f987
Rogers, Eric
611b1de0-c505-472e-a03f-c5294c63bb72
Dabkowski, Pawel
2137bb50-fd1d-44af-90e2-633709c623c1
Galkowski, Krzysztof
322994ac-7e24-4350-ab72-cc80ac8078ef
Bachelier, Olivier
486fbc42-5417-4ad0-9c42-a39a5e33f987
Rogers, Eric
611b1de0-c505-472e-a03f-c5294c63bb72

Dabkowski, Pawel, Galkowski, Krzysztof, Bachelier, Olivier and Rogers, Eric (2012) Control of discrete linear repetitive processes using strong practical stability and H? disturbance attenuation. Systems & Control Letters, 61 (12), 1138-1144. (doi:10.1016/j.sysconle.2012.10.002).

Record type: Article

Abstract

Repetitive processes are a distinct class of 2D systems of both theoretical and practical interest. This paper develops algorithms for control law design to ensure stabilization and a prescribed level of disturbance attenuation as measured by an H? norm.

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More information

Published date: December 2012
Keywords: 2d systems control, disturbance attenuation
Organisations: Southampton Wireless Group
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Identifiers

Local EPrints ID: 350717
URI: http://eprints.soton.ac.uk/id/eprint/350717
DOI: doi:10.1016/j.sysconle.2012.10.002
ISSN: 0167-6911
PURE UUID: 77384598-cba7-46e1-bd04-adf58ad4f398
ORCID for Eric Rogers: ORCID iD orcid.org/0000-0003-0179-9398

Catalogue record

Date deposited: 08 Apr 2013 11:00
Last modified: 15 Mar 2024 02:42

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Contributors

Author: Pawel Dabkowski
Author: Krzysztof Galkowski
Author: Olivier Bachelier
Author: Eric Rogers ORCID iD

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