Journal article

Stochastic MPC with dynamic feedback gain selection and discounted probabilistic constraints

Abstract:: This paper considers linear discrete-time systems with additive disturbances, and designs an MPC law incorporating a dynamic feedback gain to minimise a quadratic cost function subject to a single chance constraint. The feedback gain is selected online and we provide two selection methods based on minimising upper bounds on predicted costs. The chance constraint is defined as a discounted sum of violation probabilities on an infinite horizon. By penalising violation probabilities close to the initial time and assigning violation probabilities in the far future with vanishingly small weights, this form of constraints allows for an MPC law with guarantees of recursive feasibility without a boundedness assumption on the disturbance. A computationally convenient MPC optimisation problem is formulated using Chebyshev's inequality and we introduce an online constraint-tightening technique to ensure recursive feasibility. The closed loop system is guaranteed to satisfy the chance constraint and a quadratic stability condition. With dynamic feedback gain selection, the closed loop cost is reduced and conservativeness of Chebyshev's inequality is mitigated.

Publication status:: Published

Peer review status:: Peer reviewed

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APA Style

Yan, S., Goulart, P. J., & Cannon, M. (2021). Stochastic MPC with dynamic feedback gain selection and discounted probabilistic constraints. IEEE Transactions on Automatic Control, 67(11), 5885–5899.

MLA Style

Yan, S., et al. “Stochastic MPC with Dynamic Feedback Gain Selection and Discounted Probabilistic Constraints.” IEEE Transactions on Automatic Control, vol. 67, no. 11, IEEE, 2021, pp. 5885–99.

Chicago Style

Yan, S, PJ Goulart, and M Cannon. 2021. “Stochastic MPC with Dynamic Feedback Gain Selection and Discounted Probabilistic Constraints.” IEEE Transactions on Automatic Control 67 (11): 5885–99.
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Files:: Yan_et_al_2021_stochastic_mpc_with.pdf

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Publisher copy:: 10.1109/TAC.2021.3128466

Authors

+ Yan, S More by this author

Role:: Author

+ Goulart, PJ More by this author

Institution:: University of Oxford
Division:: MPLS
Department:: Engineering Science
Oxford college:: St Edmund Hall
Role:: Author
ORCID:: 0000-0002-0456-4124

+ Cannon, M More by this author

Institution:: University of Oxford
Division:: MPLS
Department:: Engineering Science
Oxford college:: St John's College
Role:: Author
ORCID:: 0000-0003-2189-7876

Publisher:: IEEE
Journal:: IEEE Transactions on Automatic Control More from this journal
Volume:: 67
Issue:: 11
Pages:: 5885-5899
Publication date:: 2021-11-16
Acceptance date:: 2021-10-29
DOI:: 10.1109/TAC.2021.3128466
EISSN:: 1558-2523
ISSN:: 0018-9286

Language:: English
Keywords:: FFR
Pubs id:: 1119020
Local pid:: pubs:1119020
Deposit date:: 2021-11-09

Terms of use

Copyright holder:: IEEE
Copyright date:: 2021
Rights statement:: Copyright © 2021 IEEE.
Notes:: This is the accepted manuscript version of the article. The final version is available from IEEE at https://doi.org/10.1109/TAC.2021.3128466

Licence:: Terms and Conditions of Use for Oxford University Research Archive

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