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On the Stability of Incommensurate h-Nabla Fractional-Order Difference Systems
Noureddine Djenina ,
Adel Ouannas ,
Taki-Eddine Oussaeif ,
Giuseppe Grassi ,
Iqbal M. Batiha ,
Shaher Momani ,
Ramzi B. Albadarneh
March 2022
March 14 2022
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Abstract
This work aims to present a study on the stability analysis of linear and nonlinear incommensurate h-nabla fractional-order difference systems. Several theoretical results are inferred with the help of using some theoretical schemes, such as the Z-transform method, Cauchy–Hadamard theorem, Taylor development approach, final-value theorem and Banach fixed point theorem. These results are verified numerically via two illustrative numerical examples that show the stabilities of the solutions of systems at hand.
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Most cited references21
- Record: found
- Abstract: not found
- Article: not found
Mittag–Leffler stability of fractional order nonlinear dynamic systems
Yan. Li, YangQuan Chen, Igor Podlubny (2009)
- Record: found
- Abstract: not found
- Article: not found
Stability of fractional-order nonlinear dynamic systems: Lyapunov direct method and generalized Mittag–Leffler stability
Yan. Li, YangQuan Chen, Igor Podlubny (2010)
- Record: found
- Abstract: not found
- Article: not found
Stability properties for generalized fractional differential systems
Denis Matignon, Gérard Montseny (1998)