A simple suboptimal moving horizon estimation scheme with guaranteed robust stability

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OriginalspracheEnglisch
Seiten (von - bis)19 - 24
Seitenumfang6
FachzeitschriftIEEE Control Systems Letters
Jahrgang7
PublikationsstatusVeröffentlicht - 24 Juni 2022

Abstract

We propose a suboptimal moving horizon estimation (MHE) scheme for a general class of nonlinear systems. To this end, we consider an MHE formulation that optimizes over the trajectory of a robustly stable observer. Assuming that the observer admits a Lyapunov function, we show that this function is an M-step Lyapunov function for suboptimal MHE. The presented sufficient conditions can be easily verified in practice. We illustrate the practicability of the proposed suboptimal MHE scheme with a standard nonlinear benchmark example. Here, performing a single iteration is sufficient to significantly improve the observer's estimation results under valid theoretical guarantees.

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A simple suboptimal moving horizon estimation scheme with guaranteed robust stability. / Schiller, Julian D.; Wu, Boyang; Muller, Matthias A.
in: IEEE Control Systems Letters, Jahrgang 7, 24.06.2022, S. 19 - 24.

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Schiller JD, Wu B, Muller MA. A simple suboptimal moving horizon estimation scheme with guaranteed robust stability. IEEE Control Systems Letters. 2022 Jun 24;7:19 - 24. doi: 10.48550/arXiv.2203.16090, 10.1109/LCSYS.2022.3186236
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AU - Wu, Boyang

AU - Muller, Matthias A.

N1 - This work was supported by the German Research Foundation (DFG) under Grant MU 3929/2-1.

PY - 2022/6/24

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N2 - We propose a suboptimal moving horizon estimation (MHE) scheme for a general class of nonlinear systems. To this end, we consider an MHE formulation that optimizes over the trajectory of a robustly stable observer. Assuming that the observer admits a Lyapunov function, we show that this function is an M-step Lyapunov function for suboptimal MHE. The presented sufficient conditions can be easily verified in practice. We illustrate the practicability of the proposed suboptimal MHE scheme with a standard nonlinear benchmark example. Here, performing a single iteration is sufficient to significantly improve the observer's estimation results under valid theoretical guarantees.

AB - We propose a suboptimal moving horizon estimation (MHE) scheme for a general class of nonlinear systems. To this end, we consider an MHE formulation that optimizes over the trajectory of a robustly stable observer. Assuming that the observer admits a Lyapunov function, we show that this function is an M-step Lyapunov function for suboptimal MHE. The presented sufficient conditions can be easily verified in practice. We illustrate the practicability of the proposed suboptimal MHE scheme with a standard nonlinear benchmark example. Here, performing a single iteration is sufficient to significantly improve the observer's estimation results under valid theoretical guarantees.

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KW - Lyapunov methods

KW - Moving horizon estimation (MHE)

KW - Observers

KW - Standards

KW - System dynamics

KW - Time-varying systems

KW - Trajectory

KW - nonlinear systems

KW - stability

KW - state estimation

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JO - IEEE Control Systems Letters

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