Khalid Badie scite author profile

Summary This paper is concerned with the delay‐dependent exponential stability analysis of two‐dimensional (2D) discrete switched systems with state delays described by the Roesser model; the delays under consideration are varying. By constructing an appropriate Lyapunov‐Krasovskii functional and using the average dwell time approach, new delay‐dependent sufficient conditions for the exponential stability of the system under study are proposed. In order to obtain less conservative conditions, the delay partitioning method is adopted as well as the free‐weighting matrix technique. The proposed conditions are formulated in the format of linear matrix inequality. The effectiveness and the reduced conservatism of the developed results are shown by illustrative examples.

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New Relaxed Stability Conditions for Uncertain Two-Dimensional Discrete Systems

Badie

Alfidi

Chalh

2018

J Control Autom Electr Syst

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This paper is concerned with the problem of robust stability of uncertain two-dimensional (2-D) discrete systems described by the Roesser model with polytopic uncertain parameters. Based on a newly developed parameter-dependent Lyapunov-Krasovski functional combined with Finsler's lemma, new sufficient conditions for robust stability analysis are derived in terms of linear matrix inequalities (LMIs). Numerical examples are given to show the effectiveness and less conservatism of the proposed results.

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Further results on $$H_{\infty }$$ filtering for uncertain 2-D discrete systems

Badie¹,

Alfidi²,

Chalh³

2020

Multidim Syst Sign Process

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Robust H_∞ controller design for uncertain 2D continuous systems with interval time-varying delays

Badie¹,

Alfidi²,

Tadeo

et al. 2020

International Journal of Systems Science

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The design of delay-dependent robust H∞ controllers is solved here for a class of uncertain 2-D continuous systems: those with interval time-varying delays and norm-bounded parameter uncertainties. By constructing a novel augmented Lyapunov-Krasovskii functional and then using the Wirtinger inequality, a new delay-dependent stability condition is developed, that uses the known lower and upper bounds of the time-varying delays to develop less conservative solutions that previous results in the literature. This condition is then applied to H∞ performance analysis and robust H∞ controller design, using linear matrix inequalities (LMIs).Two numerical examples are presented that illustrate the effectiveness of the proposed method.

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Static Output Feedback Control with H<inf>∞</inf> performance for 2-D Discrete Systems in Roesser Model

Badie

Alfidi

Tadeo

et al. 2018

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Khalid Badie

Exponential stability analysis for 2D discrete switched systems with state delays

New Relaxed Stability Conditions for Uncertain Two-Dimensional Discrete Systems

Further results on $$H_{\infty }$$ filtering for uncertain 2-D discrete systems

Robust H_∞ controller design for uncertain 2D continuous systems with interval time-varying delays

Static Output Feedback Control with H<inf>∞</inf> performance for 2-D Discrete Systems in Roesser Model

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Khalid Badie

Exponential stability analysis for 2D discrete switched systems with state delays

New Relaxed Stability Conditions for Uncertain Two-Dimensional Discrete Systems

Further results on $$H_{\infty }$$ filtering for uncertain 2-D discrete systems

Robust H∞ controller design for uncertain 2D continuous systems with interval time-varying delays

Static Output Feedback Control with H<inf>∞</inf> performance for 2-D Discrete Systems in Roesser Model

Contact Info

Product

Resources

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Robust H_∞ controller design for uncertain 2D continuous systems with interval time-varying delays