Improved quasi‐uniform stability criterion of fractional‐order neural networks with discrete and distributed delays

Du, Feifei; Lu, Jun‐Guo

doi:10.1002/asjc.2758

Cited by 11 publications

(4 citation statements)

References 59 publications

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“…Fractional calculus is the extension of integer calculus, which is one of the most powerful mathematical tools around the world [26][27][28][29][30]. Different from integer order systems, FO systems can describe some practical system models more accurately due to their memory property [31][32][33], for example, control processing [34], circuit systems [35], electrical noises [36], and semicrystalline polymers [37]. FO systems are also very helpful to describe the physical and dynamic processes of the problems more accurately in engineering fields because many practical problems must consider the FO dynamics behavior contained in the constituent materials [38].…”

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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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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“…Fractional calculus extends integer calculus, one of the most influential mathematical tools worldwide [18][19][20][21]. Due to their memory properties, FO systems can better explain specific actual system models [22][23][24][25], such as control processing [26], circuit systems [27], electrical noises [28], and semi-crystalline polymers [29], than integer-order systems. FO systems are also advantageous to describe the physical and dynamic processes of the problems more precisely in engineering fields because many practical problems must involve the FO dynamics behavior embedded in the constituent materials [30].…”

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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“…In recent years, fractional-order systems (FOSs) have attracted increasing interest of scholars [1][2][3][4][5][6][7][8][9][10] as they can describe the physical phenomena in nature more accurately such as electrical circuit models [11], supercapacitor models [12], neural networks [13,14], epidemic diseases prediction [15], and so on [16,17]. The main reasons lie in that the FOSs can describe the history-dependent development process of systems and have stronger global relevance than integer-order systems [18].…”

Section: Introductionmentioning

confidence: 99%

Novel admissibility and robust stabilization conditions for fractional‐order singular systems with polytopic uncertainties

Zhang

2023

Asian Journal of Control

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This paper considers the issues of the admissibility and robust stabilization of fractional‐order singular systems with polytopic uncertainties and fractional‐order and . Firstly, the novel admissibility conditions for nominal fractional‐order singular systems are proposed with no conservatism and without any equalities or nonstrict inequalities. Secondly, the robust admissibility conditions for fractional‐order singular systems with polytopic uncertainties are given based on the admissibility conditions for nominal fractional‐order singular systems. Thirdly, to make the uncertain fractional‐order singular systems robustly admissible, the methods of designing the static output feedback controllers are obtained with wider application scope, which are direct, concise, and more relaxed compared with the existing results. All the results are proposed in terms of linear matrix inequalities. Finally, three illustrative examples are given to demonstrate the effectiveness of the results.

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Improved quasi‐uniform stability criterion of fractional‐order neural networks with discrete and distributed delays

Cited by 11 publications

References 59 publications

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

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

Novel admissibility and robust stabilization conditions for fractional‐order singular systems with polytopic uncertainties

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