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PI Control of discrete linear repetitive processes

PI Control of discrete linear repetitive processes
PI Control of discrete linear repetitive processes
Repetitive processes are a distinct class of 2D systems (i.e. information propagation in two independent directions) of both systems theoretic and applications interest. They cannot be controlled by direct extension of existing techniques from either standard (termed 1D here) or 2D systems theory. In this paper, we exploit their unique physical structure to show how two term, i.e. proportional plus integral (or PI) action, can be used to control these processes to produce desired behavior (as opposed to just stability).
0005-1098
877-880
Sulikowski, B.
22408736-e030-42c6-90b1-9ab71ae3b692
Galkowski, K.
40c02cf5-8fcb-44de-bb1e-f9f70fdd265d
Rogers, E.
611b1de0-c505-472e-a03f-c5294c63bb72
Owens, D.H.
3452e9bb-d3bd-4995-b4bb-424bbd288b09
Sulikowski, B.
22408736-e030-42c6-90b1-9ab71ae3b692
Galkowski, K.
40c02cf5-8fcb-44de-bb1e-f9f70fdd265d
Rogers, E.
611b1de0-c505-472e-a03f-c5294c63bb72
Owens, D.H.
3452e9bb-d3bd-4995-b4bb-424bbd288b09

Sulikowski, B., Galkowski, K., Rogers, E. and Owens, D.H. (2006) PI Control of discrete linear repetitive processes. Automatica, 42 (5), 877-880. (doi:10.1016/j.automatica.2006.01.012).

Record type: Article

Abstract

Repetitive processes are a distinct class of 2D systems (i.e. information propagation in two independent directions) of both systems theoretic and applications interest. They cannot be controlled by direct extension of existing techniques from either standard (termed 1D here) or 2D systems theory. In this paper, we exploit their unique physical structure to show how two term, i.e. proportional plus integral (or PI) action, can be used to control these processes to produce desired behavior (as opposed to just stability).

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e-pub ahead of print date: 10 March 2006
Published date: May 2006
Organisations: Southampton Wireless Group

Identifiers

Local EPrints ID: 264357
URI: http://eprints.soton.ac.uk/id/eprint/264357
ISSN: 0005-1098
PURE UUID: a4e2f7d3-277c-4c05-acbf-5c1f97d22dc7
ORCID for E. Rogers: ORCID iD orcid.org/0000-0003-0179-9398

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Date deposited: 29 Jul 2007
Last modified: 17 Dec 2019 02:02

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