New results on higher-order iterative learning control for discrete linear systems
New results on higher-order iterative learning control for discrete linear systems
Iterative learning control is applicable to systems that make sweeps or passes through dynamics defined over a finite duration. Once each pass is complete all information generated as its dynamics evolve are available for use in designing the control action to be applied on the next sweep. The design problem is to construct a sequence of control inputs to enforce convergence to a specified reference of the sequence formed from the output produced on each pass and in this form of control the input is that used on the previous pass plus a correction term computed using previous pass output. A critical feature is the ability to use information that would be non-causal in the standard setting provided it is generated on a previous pass. Higher order iterative learning control uses information from more than the previous pass and is the subject of this paper where the generalized KalmanYakubovich-Popov lemma is used to develop new designs
Wang, X.
976221d1-3004-409c-8640-715bedfc5d15
Chu, B.
555a86a5-0198-4242-8525-3492349d4f0f
Rogers, E.
611b1de0-c505-472e-a03f-c5294c63bb72
2017
Wang, X.
976221d1-3004-409c-8640-715bedfc5d15
Chu, B.
555a86a5-0198-4242-8525-3492349d4f0f
Rogers, E.
611b1de0-c505-472e-a03f-c5294c63bb72
Wang, X., Chu, B. and Rogers, E.
(2017)
New results on higher-order iterative learning control for discrete linear systems.
In 2017 10th International Workshop on Multidimensional (nD) Systems, nDS 2017.
IEEE..
(doi:10.1109/NDS.2017.8070632).
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Conference or Workshop Item
(Paper)
Abstract
Iterative learning control is applicable to systems that make sweeps or passes through dynamics defined over a finite duration. Once each pass is complete all information generated as its dynamics evolve are available for use in designing the control action to be applied on the next sweep. The design problem is to construct a sequence of control inputs to enforce convergence to a specified reference of the sequence formed from the output produced on each pass and in this form of control the input is that used on the previous pass plus a correction term computed using previous pass output. A critical feature is the ability to use information that would be non-causal in the standard setting provided it is generated on a previous pass. Higher order iterative learning control uses information from more than the previous pass and is the subject of this paper where the generalized KalmanYakubovich-Popov lemma is used to develop new designs
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Published date: 2017
Venue - Dates:
2017 10th International Workshop on Multidimensional (nD) Systems (nDS), , Zielona Gora, Poland, 2017-09-13 - 2017-09-15
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Local EPrints ID: 472439
URI: http://eprints.soton.ac.uk/id/eprint/472439
PURE UUID: fad7db7d-300b-40bd-b1ae-da32ce2a4fd2
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Date deposited: 05 Dec 2022 17:56
Last modified: 17 Mar 2024 03:28
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Author:
X. Wang
Author:
B. Chu
Author:
E. Rogers
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