Overflow oscillations‐free realization of discrete‐time 2D Roesser models under quantization and overflow constraints

Malik, Saddam Hussain; Tufail, Muhammad; Rehan, Muhammad; Rashid, Haroon

doi:10.1002/asjc.2532

Cited by 8 publications

(5 citation statements)

References 28 publications

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“…As a result, investigating the GAS of 2-D DSs employing time-varying delays (TVDs) is an important research topic. Several authors have paid attention to the problem of GAS in 2-D delayed DSs [15][16][17][19][20][21].…”

Section: *Author For Correspondencementioning

confidence: 99%

“…It is worth noting that Equations 1-5 cover a broad range of 2-D practical uncertain systems with TVDs and SNL. Such systems cover 2-D control systems [32] with SNL [16], 2-D DSs employed on a digital signal processor [33], wireless sensor networks [34], vehicle control systems [35], networked control systems [36], etc.…”

Section: ( ) ( ) mentioning

confidence: 99%

“…It may frequently occur in realistic systems owing to transmission delays, measurement delays, computational delays, etc. The presence of delay in practical systems may cause undesired transient responses and, thus, lead the system towards instability [9,[13][14][15][16][17][18][19][20][21][22].…”

Section: Introductionmentioning

confidence: 99%

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Stability of uncertain 2-D discrete delayed systems with saturation

2022

IJATEE

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Based on the Roesser model with saturation nonlinearities (SNL) and time-varying delays (TVDs), this paper studies the global asymptotic stability (GAS) of two-dimensional (2-D) uncertain discrete systems (DSs). The underlying system involves norm-bounded parameter uncertainties. By utilizing the idea of Wirtinger-based inequality (WBI) with reciprocal convex inequality (RCI), a new criterion is derived to ensure the GAS of 2-D systems. Numerical examples demonstrate the advantages of the proposed method.With the MATLAB software and YALMIP 3.0, it is found that the obtained criterion provides less stringent results than an existing criterion.

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Section: *Author For Correspondencementioning

confidence: 99%

Section: ( ) ( ) mentioning

confidence: 99%

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Stability of uncertain 2-D discrete delayed systems with saturation

2022

IJATEE

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“…Nowadays, an increased number of scholars have a strong interest in the research of two-dimensional (2D) systems [1][2][3][4]. Different from one-dimensional (1D) systems, the state space of 2D systems has two dimensions, which can describe more system information.…”

Section: Introductionmentioning

confidence: 99%

H∞ filtering for continuous fractional‐order 2D Roesser model: The 0<α≤1 case

Zhang

2023

Asian Journal of Control

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This paper investigates the filtering for the continuous fractional‐order (FO) two‐dimensional (2D) Roesser model with the FO between 0 and 1. Firstly, a sufficient condition to ensure the stability and bounded realness in the sense of ‐norm for the continuous FO 2D Roesser model is given in the form of linear matrix inequalities (LMIs). Secondly, based on the bounded real lemmas proposed above, the filtering problem for continuous FO 2D Roesser model is addressed through some congruent transformation and matrix transformation. The results are given in LMI form, and the parameters of the continuous FO 2D filters can be achieved from the LMIs easily. In the end, the effectiveness of the proposed results is verified by two numerical examples.

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“…Over the past decades, an increasing number of scholars have participated in the study of 2D systems [1][2][3][4]. Two-dimensional (2D) systems differ from one-dimensional (1D) systems in that their state spaces have two dimensions; thus, 2D systems may typically describe more system information than 1D systems.…”

Section: Introductionmentioning

confidence: 99%

Robust ∞ model reduction for the continuous fractional‐order two‐dimensional Roesser system: The 0 < ε ≤ 1 case

Zhang,

2023

Math Methods in App Sciences

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This study analyzes the model reduction methods and the robust model reduction methods for the continuous fractional‐order (FO) two‐dimensional (2D) Roesser system with the FO ranging from 0 to 1. A sufficient LMI‐based condition is given by Projection Lemma, the FO‐stable‐region‐analyze method and matrix analysis, guaranteeing that the error system is stable and that its transfer function's ‐norm is bounded. Then, the approach to design the reduced‐model system of the original continuous FO 2D Roesser model is given. The robust model reduction methods for continuous FO 2D Roesser systems with polytopic uncertainties are proposed based on the results above. In the end, two numerical examples are used to demonstrate the effectiveness of the results.

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Overflow oscillations‐free realization of discrete‐time 2D Roesser models under quantization and overflow constraints

Cited by 8 publications

References 28 publications

Stability of uncertain 2-D discrete delayed systems with saturation

Stability of uncertain 2-D discrete delayed systems with saturation

H∞ filtering for continuous fractional‐order 2D Roesser model: The 0<α≤1 case

Robust ∞ model reduction for the continuous fractional‐order two‐dimensional Roesser system: The 0 < ε ≤ 1 case

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