Characterizations of two different fractional operators without singular kernel

Yavuz, Mehmet

doi:10.1051/mmnp/2018070

Cited by 77 publications

(49 citation statements)

References 34 publications

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“…Researchers have continuously extended the definitions of fractional order derivatives like the Riemann-Liouville, the Caputo, Caputo-Fabrizio, Atangana-Baleanu, the Grunwald-Letnikov, the Weyl, the Marchaud, the Riesz, and the Miller and Ross [48][49][50][51][52] . Recently, many new definitions of fractional derivative [53] have hugely evolved, going from the derivatives with nonsingular kernel and new Riemann-Liouville fractional derivative without singular kernel to the two-parameter derivatives with non-singular and non-local kernel [54][55][56] . Definition 2.1.…”

Section: Mathematical Preliminariesmentioning

confidence: 99%

Global dynamics of a fractional order model for the transmission of HIV epidemic with optimal control

Naik

Owolabi

2020

Chaos, Solitons & Fractals

165

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Elsevier has created a COVID-19 resource centre with free information in English and Mandarin on the novel coronavirus COVID-19. The COVID-19 resource centre is hosted on Elsevier Connect, the company's public news and information website. Elsevier hereby grants permission to make all its COVID-19-related research that is available on the COVID-19 resource centre-including this research content-immediately available in PubMed Central and other publicly funded repositories, such as the WHO COVID database with rights for unrestricted research re-use and analyses in any form or by any means with acknowledgement of the original source. These permissions are granted for free by Elsevier for as long as the COVID-19 resource centre remains active.

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Section: Mathematical Preliminariesmentioning

confidence: 99%

Global dynamics of a fractional order model for the transmission of HIV epidemic with optimal control

Naik

Owolabi

2020

Chaos, Solitons & Fractals

165

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“…In order to have the following indexed term while construction of the FDM, we insert Equations (19) and (20) into Equation 1:…”

Section: The Difference Operators Asmentioning

confidence: 99%

“…Avci et al [15] explored a heat conduction equation with respect to the Caputo-Fabrizio fractional derivative. Many other fractional models have been treated with these fractional-order derivatives [16][17][18][19][20][21][22].…”

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confidence: 99%

Analytical and numerical approaches to nerve impulse model of fractional‐order

Yavuz

Yokuş

2020

Numerical Methods Partial

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We consider a fractional-order nerve impulse model which is known as FitzHugh-Nagumo (F-N) model in this paper. Knowing the solutions of this model allows the management of the nerve impulses process. Especially, considering this model as fractional-order ensures to be able to analyze in detail because of the memory effect. In this context, first, we use an analytical solution and with the aim of this solution, we obtain numerical solutions by using two numerical schemes. Then, we demonstrate the walking wave-type solutions of the stated problem. These solutions include complex trigonometric functions, complex hyperbolic functions, and algebraic functions. In addition, the linear stability analysis is performed and the absolute error is occurred by comparing the numerical results with the analytical result. All of the results are depicted by tables and figures. This paper not only points out the exact and numerical solutions of the model but also compares the differences and the similarities of the stated solution methods. Therefore, the results of this paper are important and useful for either neuroscientists and physicists or mathematicians and engineers. KEYWORDS (G ′ /G, 1/G)-expansion method, finite difference scheme, FitzHugh-Nagumo model, Laplace decomposition method, linear stability analysis, numerical analysis 1 INTRODUCTION Nonlinear partial differential equations (NLPDEs) have several applications in engineering and physics. In recent years, the nonlinear fractional-order differential equations have been utilized in

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“…The homotopy asymptotic method (HAM) is also effective in solving a differential equation. Some result work comprises linear and nonlinear fractional differential equations considering different constraints without a singular kernel [24,25]. The model shows that OHAM/HAM guarantee good approximation and better convergence rate than other numerical techniques.…”

Section: Introductionmentioning

confidence: 99%

An Efficient Analytical Technique for Time-Fractional Parabolic Partial Differential Equations

et al. 2020

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In this work, we examine time-fractional fourth-order parabolic partial differential equations with the aid of the optimal homotopy asymptotic method (OHAM). The 2nd order approximate results obtained by using the suggested scheme are compared with the exact solution. It has been noted that the results achieved via OHAM have a large convergence rate for the problems. The solutions are graphically analyzed, and the relative errors are presented in tabular form.

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Characterizations of two different fractional operators without singular kernel

Cited by 77 publications

References 34 publications

Global dynamics of a fractional order model for the transmission of HIV epidemic with optimal control

Global dynamics of a fractional order model for the transmission of HIV epidemic with optimal control

Analytical and numerical approaches to nerve impulse model of fractional‐order

An Efficient Analytical Technique for Time-Fractional Parabolic Partial Differential Equations

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