Optimality and iterative learning control: duality and input prediction
Optimality and iterative learning control: duality and input prediction
This thesis considers the use of optimal techniques within iterative learning control (ILC) applied to linear systems. Two different aspects are addressed: the first is the duality relationship existing between iterative learning control and repetitive control which allows the synthesis of controllers developed in one domain to be applied in the other. Significant extensions to existing duality framework are made by eliminating an explicit current-error feedback loop and providing the facility of both current error feedback, and previous error feedforward within the control structure. This, in turn, with the case when either state-feedback or output-feedback is used to solve the ILC control paradigm extends the range of underlying plants to which the framework can be applied. In this context optimal control is used to solve the stabilisation problem which yields solutions for both RC and ILC cases in terms of state-feedback, and for ILC in terms of output-injection. These significantly extend the range of underlying plants to which the framework can be applied. The second aspect addressed is the selection of a suitable first input. Whilst ILC algorithms have been shown to over a high level of performance both theoretically and in practical applications, resulting error convergence is generally highly dependent on the initial choice of input applied. Optimal techniques are therefore applied to generate the most appropriate initial input to speed up the learning process over subsequent trials. Two approaches are developed to tackle the problem, both involving optimal solutions. The first is frequency domain bases, and involves a description of system uncertainty. An input is constructed which maximises convergence in the presence of uncertainty and noise, making use of the Fast Fourier Transform (FFT). The second approach is time domain based and an initial input is constructed using a library of previous references and their associated converged inputs. The assumption of system linearity is used to find the choice of previous inputs which maximises robust convergence. It is then shown how the frequency and time domain schemes may be combined. Both the duality and initial input techniques developed in this thesis have been evaluated experimentally on a gantry robot testbed, and the results obtained confirm the success of these additions to the ILC/RC framework
Alsubaie, Muhammad Ali
7755a436-9365-4fed-aa83-eaafd3a2c2c3
March 2011
Alsubaie, Muhammad Ali
7755a436-9365-4fed-aa83-eaafd3a2c2c3
Rogers, E.
611b1de0-c505-472e-a03f-c5294c63bb72
Freeman, C.T.
ccdd1272-cdc7-43fb-a1bb-b1ef0bdf5815
Alsubaie, Muhammad Ali
(2011)
Optimality and iterative learning control: duality and input prediction.
University of Southampton, School of Electronics and Computer Science, Doctoral Thesis, 148pp.
Record type:
Thesis
(Doctoral)
Abstract
This thesis considers the use of optimal techniques within iterative learning control (ILC) applied to linear systems. Two different aspects are addressed: the first is the duality relationship existing between iterative learning control and repetitive control which allows the synthesis of controllers developed in one domain to be applied in the other. Significant extensions to existing duality framework are made by eliminating an explicit current-error feedback loop and providing the facility of both current error feedback, and previous error feedforward within the control structure. This, in turn, with the case when either state-feedback or output-feedback is used to solve the ILC control paradigm extends the range of underlying plants to which the framework can be applied. In this context optimal control is used to solve the stabilisation problem which yields solutions for both RC and ILC cases in terms of state-feedback, and for ILC in terms of output-injection. These significantly extend the range of underlying plants to which the framework can be applied. The second aspect addressed is the selection of a suitable first input. Whilst ILC algorithms have been shown to over a high level of performance both theoretically and in practical applications, resulting error convergence is generally highly dependent on the initial choice of input applied. Optimal techniques are therefore applied to generate the most appropriate initial input to speed up the learning process over subsequent trials. Two approaches are developed to tackle the problem, both involving optimal solutions. The first is frequency domain bases, and involves a description of system uncertainty. An input is constructed which maximises convergence in the presence of uncertainty and noise, making use of the Fast Fourier Transform (FFT). The second approach is time domain based and an initial input is constructed using a library of previous references and their associated converged inputs. The assumption of system linearity is used to find the choice of previous inputs which maximises robust convergence. It is then shown how the frequency and time domain schemes may be combined. Both the duality and initial input techniques developed in this thesis have been evaluated experimentally on a gantry robot testbed, and the results obtained confirm the success of these additions to the ILC/RC framework
Text
Muhammad-Alsubaie-Thesis.pdf
- Other
More information
Published date: March 2011
Organisations:
University of Southampton, Electronics & Computer Science
Identifiers
Local EPrints ID: 195007
URI: http://eprints.soton.ac.uk/id/eprint/195007
PURE UUID: 910206d3-a043-44da-947e-8dc57777f7ce
Catalogue record
Date deposited: 17 Aug 2011 13:17
Last modified: 15 Mar 2024 02:42
Export record
Contributors
Author:
Muhammad Ali Alsubaie
Thesis advisor:
E. Rogers
Thesis advisor:
C.T. Freeman
Download statistics
Downloads from ePrints over the past year. Other digital versions may also be available to download e.g. from the publisher's website.
View more statistics