Low-Complexity Polytopic Invariant Sets for Linear Systems Subject to Norm-Bounded Uncertainty

Tahir, Furqan; Jaimoukha, Imad M.

doi:10.1109/tac.2014.2352692

Cited by 34 publications

(43 citation statements)

References 18 publications

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“…While it is easy ex post to evaluate the effect of ignoring the positive term by looking at its magnitude, it is more subtle how much conservativeness that is introduced by restricting Θ j . Once an initial solution is obtained, it can be iteratively updated as in [19] by using the values of LMI variables Φ 0 j and H 0 x from a previous iteration. The idea is to use a different matrix inverse identity than the one employed in the proof Lemma 3.…”

Section: Discussion About Conservativenessmentioning

confidence: 99%

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Synthesis of separable controlled invariant sets for modular local control design

Nilsson

Özay

2016

2016 American Control Conference (ACC)

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Abstract-Many correct-by-construction control synthesis methods suffer from the curse of dimensionality. Motivated by this challenge, we seek to reduce a correct-by-construction control synthesis problem to subproblems of more modest dimension. As a step towards this goal, in this paper we consider the problem of synthesizing decoupled robustly controlled invariant sets for dynamically coupled linear subsystems with state and input constraints. Our approach, which gives sufficient conditions for decoupled invariance, is based on optimization over linear matrix inequalities which are obtained using slack variable identities. We illustrate the applicability of our method on several examples, including one where we solve local control synthesis problems in a compositional manner.

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Section: Discussion About Conservativenessmentioning

confidence: 99%

“…x . Thus after the same re-definitions as above forD j x ,D j d andΦ j , we get the LMI (19). We move on to finding an expression that ensures (17).…”

mentioning

confidence: 97%

Synthesis of separable controlled invariant sets for modular local control design

Nilsson

Özay

2016

2016 American Control Conference (ACC)

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“…Note that for m = n, (P, b) reduces to a low-complexity polytope. 20,25 The requirements on an RCI set 30 include invariance and output constraint satisfaction. For system (1), set (P, b) and given 0 <̄∈ R n , these can be written as…”

Section: Robust Control Invariant Setmentioning

confidence: 99%

“…Furthermore, the fact that matrix P is considered to be nonsquare prevents the direct application of the linearization procedure presented in the work of Tahir and Jaimoukha. 25 In this section, we propose a linearization algorithm, extending the basic ideas proposed in the work of Liu and Jaimoukha 26 that involves the computation of an initial solution. An update algorithm is then presented in the next section.…”

Section: Linearization and Initial Computationmentioning

confidence: 99%

Full‐complexity polytopic robust control invariant sets for uncertain linear discrete‐time systems

Liu

Tahir

Jaimoukha

2019

Intl J Robust & Nonlinear

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This paper presents an algorithm for the computation of full-complexity polytopic robust control invariant (RCI) sets, and the corresponding linear statefeedback control law. The proposed scheme can be applied for linear discretetime systems subject to additive disturbances and structured norm-bounded or polytopic uncertainties. Output, initial condition, and performance constraints are considered. Arbitrary complexity of the invariant polytope is allowed to enable less conservative inner/outer approximations to the RCI sets whereas the RCI set is assumed to be symmetric around the origin. The nonlinearities associated with the computation of such an RCI set structure are overcome through the application of Farkas' theorem and a corollary of the elimination lemma to obtain an initial polytopic RCI set, which is guaranteed to exist under certain conditions. A Newton-like update, which is recursively feasible, is then proposed to yield desirable large/small volume RCI sets. KEYWORDS full-complexity polytope, LMIs, optimization, robust control invariant sets, uncertain systems Int J Robust Nonlinear Control. 2019;29:3587-3605.wileyonlinelibrary.com/journal/rnc

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“…As a result, References 11,15‐18 proposed different approaches for the computation of restricted complexity or low complexity polytopic RCI sets. Algorithms developed by References 15‐17 are applicable to polytopic linear systems, whereas those in References 11,18 can be applied to affinely parameter‐dependent systems. It is important to mention here that all these algorithms assume the invariance inducing controller to be based on linear state feedback, which is computed by the algorithm while optimizing the volume of the set.…”

Section: Introductionmentioning

confidence: 99%

Computation of robust control invariant sets with predefined complexity for uncertain systems

Gupta

Köroğlu

Falcone

2020

Intl J Robust & Nonlinear

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This paper presents an algorithm that computes polytopic robust control‐invariant (RCI) sets for rationally parameter‐dependent systems with additive disturbances. By means of novel linear matrix inequalities (LMI) feasibility conditions for invariance along with a newly developed method for volume maximization, an iterative algorithm is proposed for the computation of RCI sets with maximized volumes. The obtained RCI sets are symmetric around the origin by construction and have a user‐defined level of complexity. Unlike many similar approaches, the proposed algorithm directly computes the RCI sets without requiring control inputs to be in a specific feedback form. In fact, a specific control input is obtained from the LMI problem for each extreme point of the RCI set. The outcomes of the proposed algorithm can be used to construct a piecewise‐affine controller based on offline computations.

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Low-Complexity Polytopic Invariant Sets for Linear Systems Subject to Norm-Bounded Uncertainty

Cited by 34 publications

References 18 publications

Synthesis of separable controlled invariant sets for modular local control design

Synthesis of separable controlled invariant sets for modular local control design

Full‐complexity polytopic robust control invariant sets for uncertain linear discrete‐time systems

Computation of robust control invariant sets with predefined complexity for uncertain systems

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