New predictor‐corrector scheme for solving nonlinear differential equations with Caputo‐Fabrizio operator

Toh, Yoke Teng; Phang, Chang; Loh, Jian Rong

doi:10.1002/mma.5331

Cited by 27 publications

(14 citation statements)

References 27 publications

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“…This is because most of the system of fractional differential equation or fractional dynamical system do not have analytical solution. Furthermore, we had also modified this approach for solving differential equation in Caputo-Fabrizio sense as in [23].…”

Section: Numerical Resultsmentioning

confidence: 99%

Computation of Stability Criterion for Fractional Shimizu–Morioka System Using Optimal Routh–Hurwitz Conditions

Phang

2019

Computation

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Nowadays, the dynamics of non-integer order system or fractional modelling has become a widely studied topic due to the belief that the fractional system has hereditary properties. Hence, as part of understanding the dynamic behaviour, in this paper, we will perform the computation of stability criterion for a fractional Shimizu–Morioka system. Different from the existing stability analysis for a fractional dynamical system in literature, we apply the optimal Routh–Hurwitz conditions for this fractional Shimizu–Morioka system. Furthermore, we introduce the way to calculate the range of adjustable control parameter β to obtain the stability criterion for fractional Shimizu–Morioka system. The result will be verified by using the predictor-corrector scheme to obtain the time series solution for the fractional Shimizu–Morioka system. The findings of this study can provide a better understanding of how adjustable control parameter β influences the stability criterion for fractional Shimizu–Morioka system.

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Section: Numerical Resultsmentioning

confidence: 99%

Computation of Stability Criterion for Fractional Shimizu–Morioka System Using Optimal Routh–Hurwitz Conditions

Phang

2019

Computation

Self Cite

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“…Here, we use a numerical method based on Adams-Bashforth methods proposed in [44,45] for solving FDEs with Caputo derivative. In [22], authors have investigated a fractional Adams-Bashforth method for solving FDEs with the CF operator. In this section, we improve the method to solve the LV system of the CF operator and we compare it with the solutions of the counterpart with the Caputo operator.…”

Section: Numerical Algorithmmentioning

confidence: 99%

“…Likewise, the Predictor-Corrector methods have been exploited for solving many nonlinear ordinary differential equations. Based on the fractional Euler method and fractional trapeziodal rule, the Predictor-Corrector scheme or the Adams-Bashforth-Moulton method can be extended to efficiently solve a differential equation involving a CF operator [22]. A new form of this method for the solution of differential equations with Caputo, Caputo-Fabrizio and Atangana-Baleanu fractional derivatives is proposed in [23] by considering the nonlinearity of the different kernels-the power law for the Riemann-Liouville, the exponential decay law for the Caputo-Fabrizio, and the Mittag-Leffler law for the Atangana-Baleanu fractional derivative.…”

Section: Introductionmentioning

confidence: 99%

Three-Species Lotka-Volterra Model with Respect to Caputo and Caputo-Fabrizio Fractional Operators

et al. 2021

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In this paper, we apply the concept of fractional calculus to study three-dimensional Lotka-Volterra differential equations. We incorporate the Caputo-Fabrizio fractional derivative into this model and investigate the existence of a solution. We discuss the uniqueness of the solution and determine under what conditions the model offers a unique solution. We prove the stability of the nonlinear model and analyse the properties, considering the non-singular kernel of the Caputo-Fabrizio operator. We compare the stability conditions of this system with respect to the Caputo-Fabrizio operator and the Caputo fractional derivative. In addition, we derive a new numerical method based on the Adams-Bashforth scheme. We show that the type of differential operators and the value of orders significantly influence the stability of the Lotka-Volterra system and numerical results demonstrate that different fractional operator derivatives of the nonlinear population model lead to different dynamical behaviors.

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“…Many attempts were allotted to catch many extensible, thought‐provoking, and unique nonsingular fractional operators based on kernels . In 2015, Caputo and Fabrizio discovered a new operator of arbitrary order, namely, Caputo‐Fabrizio (CF) operator with arbitrary order and enforced to the several linear and nonlinear physical problems . In 2016, Atangana and Baleanu introduced another nonsingular derivative based on Miitag‐Leffler kernel and applied to the many problems .…”

Section: Introductionmentioning

confidence: 99%

An analysis for heat equations arises in diffusion process using new Yang‐Abdel‐Aty‐Cattani fractional operator

Kumar

Ghosh

Samet

et al. 2020

Math Methods in App Sciences

179

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The heat equation is parabolic partial differential equation and occurs in the characterization of diffusion progress. In the present work, a new fractional operator based on the Rabotnov fractional-exponential kernel is considered. Next, we conferred some fascinating and original properties of nominated new fractional derivative with some integral transform operators where all results are significant. The fundamental target of the proposed work is to solve the multi dimensional heat equations of arbitrary order by using analytical approach homotopy perturbation transform method and residual power series method, where new fractional operator has been taken in new Yang-Abdel-Aty-Cattani (YAC) sense. The obtained results indicate that solution converges to the original solution in language of generalized Mittag-Leffler function. Three numerical examples are discussed to draw an effective attention to reveal the proficiency and adaptability of the recommended methods on new YAC operator. KEYWORDS HPTM and RPSM, multidimensional heat equations, new fractional derivative, new YAC operator, Prabhakar or generalized Mittag-Leffler function MSC CLASSIFICATION 26A33; 34A08; 34A34; 60G22 Math Meth Appl Sci. 2020;43:6062-6080. wileyonlinelibrary.com/journal/mma

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New predictor‐corrector scheme for solving nonlinear differential equations with Caputo‐Fabrizio operator

Cited by 27 publications

References 27 publications

Computation of Stability Criterion for Fractional Shimizu–Morioka System Using Optimal Routh–Hurwitz Conditions

Computation of Stability Criterion for Fractional Shimizu–Morioka System Using Optimal Routh–Hurwitz Conditions

Three-Species Lotka-Volterra Model with Respect to Caputo and Caputo-Fabrizio Fractional Operators

An analysis for heat equations arises in diffusion process using new Yang‐Abdel‐Aty‐Cattani fractional operator

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