2020
DOI: 10.48550/arxiv.2003.06808
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Robust Constraint Satisfaction in Data-Driven MPC

Julian Berberich,
Johannes Köhler,
Matthias A. Müller
et al.

Abstract: We propose a purely data-driven model predictive control (MPC) scheme to control unknown linear time-invariant systems with guarantees on stability and constraint satisfaction in the presence of noisy data. The scheme predicts future trajectories based on data-dependent Hankel matrices, which span the full system behavior if the input is persistently exciting. This paper extends previous work on data-driven MPC by including a suitable constraint tightening which ensures that the closed-loop output trajectory s… Show more

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Cited by 3 publications
(5 citation statements)
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“…With d = 0 ∈ D δ , this concludes the existence of d ∈ D δ and V ∈ V T , so the assumption of Fact 1 is verified. Then, we apply Fact 1 with clear correspondences between the quantities in (27) and those in (3), and obtain that ( 16) holds if and only if for all x ∈ S, there exists E ∈ R ns×(n d +T n d ) such that (23) holds.…”
Section: A Proof Of Theoremmentioning
confidence: 99%
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“…With d = 0 ∈ D δ , this concludes the existence of d ∈ D δ and V ∈ V T , so the assumption of Fact 1 is verified. Then, we apply Fact 1 with clear correspondences between the quantities in (27) and those in (3), and obtain that ( 16) holds if and only if for all x ∈ S, there exists E ∈ R ns×(n d +T n d ) such that (23) holds.…”
Section: A Proof Of Theoremmentioning
confidence: 99%
“…While early use of this insight in the context of data-driven control has appeared, e.g., in [31], [33], recent contributions have emphasized its role in the constrained optimal control of unknown stochastic linear systems [13], [14] and in the derivation of explicit formulas for data-driven control with optimal and robust performance [19]. Since then, many very recent works in data-driven control have appeared, among which [4], [35], [5], [32], [36], [3], [23], [6]. In the context of stabilization or H 2 , H ∞ control (instead of robust invariance), data-driven approaches with noisy data were considered in [19], [36], [4].…”
Section: Introductionmentioning
confidence: 99%
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“…However, offline verification of the corresponding detectability and stabilizability conditions (Ass. [3][4] with such an implicit data based model is still an open research topic, compare, e.g., [40] where controllability/observability properties are verified using data.…”
Section: Assumption 3 (Local Stabilizability)mentioning
confidence: 99%
“…While Coulson et al (2020) derive open-loop robustness guarantees of the scheme, Berberich et al (2021) prove desirable closed-loop stability and robustness properties, even if the measured data are affected by noise. Further theoretical results on robust constraint satisfaction based on noisy data and on a tracking MPC formulation are derived by Berberich et al (2020b) and Berberich et al (2020a), respectively. Notably, the existing works with closed-loop guarantees by Berberich et al (2021Berberich et al ( , 2020a require terminal equality constraints, which may result in a small region of attraction and a small robustness margin.…”
Section: Introductionmentioning
confidence: 99%