2018 European Control Conference (ECC) 2018
DOI: 10.23919/ecc.2018.8550216
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Data-driven control design in the Loewner framework: Dealing with stability and noise

Abstract: The L-DDC (Loewner Data Driven Control) algorithm is a data-driven controller design method based on frequency-domain input-output data. The identification of the plant is skipped and the controller is designed directly from the measurements using the Loewner approach, known for model approximation and reduction. However, in the L-DDC method, the identified controller is not guaranteed to be stable and the effect of noise on the identified controller is unknown. In this article, we ensure the stability of the … Show more

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Cited by 12 publications
(19 citation statements)
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“…The L-DDC algorithm, introduced in [3], is based on frequency-domain data {ω i , P (ıω i )} The Loewner framework allows to identify an interpolating model K of the ideal controller K in the second step, see [9]. In order to avoid the compensation of the plant's RHP zeros, the L-DDC alorithm has been modified in [10]: the interpolating model K is projected on RH ∞ , using the technique presented in [11]. It corresponds to step 3 of Algorithm 1.…”
Section: A Preliminary Results: Loewner Data-driven Controlmentioning
confidence: 99%
See 4 more Smart Citations
“…The L-DDC algorithm, introduced in [3], is based on frequency-domain data {ω i , P (ıω i )} The Loewner framework allows to identify an interpolating model K of the ideal controller K in the second step, see [9]. In order to avoid the compensation of the plant's RHP zeros, the L-DDC alorithm has been modified in [10]: the interpolating model K is projected on RH ∞ , using the technique presented in [11]. It corresponds to step 3 of Algorithm 1.…”
Section: A Preliminary Results: Loewner Data-driven Controlmentioning
confidence: 99%
“…By construction of M f , the ideal controller itself is also stable, see (1). Finally, since the L-DDC algorithm [10] enforces the stability of the identified controller K, ∆ is stable. The sufficient condition (11) is obtained by applying the small-gain theorem, see [15].…”
Section: Data-driven Controller Validationmentioning
confidence: 99%
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