Comparing the new fractional derivative operators involving exponential and Mittag-Leffler kernel

Yavuz, Mehmet; Özdemir, Necati

doi:10.3934/dcdss.2020058

Cited by 56 publications

(38 citation statements)

References 23 publications

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“…Over the last century, fractional differential equations (FDEs) have attracted a great deal of attention from scientists due to their ability to raise real-world issues in numerous engineering fields and physics. FDEs are broadly used in certain fields of science [1][2][3][4][5]. Several phenomena in chemistry, physics, engineering, and other sciences can be effectively described using fractional calculus.…”

Section: Introductionmentioning

confidence: 99%

An Analytical Investigation of Fractional-Order Biological Model Using an Innovative Technique

Khan

Qurashi

et al. 2020

Complexity

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In this paper, a new so-called iterative Laplace transform method is implemented to investigate the solution of certain important population models of noninteger order. The iterative procedure is combined effectively with Laplace transformation to develop the suggested methodology. The Caputo operator is applied to express the noninteger derivative of fractional order. The series form solution is obtained having components of convergent behavior toward the exact solution. For justification and verification of the present method, some illustrative examples are discussed. The closed contact is observed between the obtained and exact solutions. Moreover, the suggested method has a small volume of calculations; therefore, it can be applied to handle the solutions of various problems with fractional-order derivatives.

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Section: Introductionmentioning

confidence: 99%

An Analytical Investigation of Fractional-Order Biological Model Using an Innovative Technique

Khan

Qurashi

et al. 2020

Complexity

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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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“…On the other hand, some special analytical and numerical approximation methods for fractional PDEs have been developed by using these mentioned operators. For instance, Laplace homotopy transform method (LHTM) [29], homotopy analysis transform method (HATM) [27,28], an extended transport model [30], etc.…”

Section: Yavuzmentioning

confidence: 99%

Characterizations of two different fractional operators without singular kernel

Yavuz

2019

Math. Model. Nat. Phenom.

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In this paper, we analyze the behaviours of two different fractional derivative operators defined in the last decade. One of them is defined with the normalized sinc function (NSF) and the other one is defined with the Mittag-Leffler function (MLF). Both of them have a non-singular kernel. The fractional derivative operator defined with the MLF is developed by Atangana and Baleanu (ABO) in 2016 and the other operator defined with the normalized sinc function (NSFDO) is created by Yang et al. in 2017. These mentioned operators have some advantages to model the real life problems and to solve them. On the other hand, since the Laplace transform (LT) of the ABO can be calculated more easily, it can be preferred to solve linear/nonlinear problems. In this study, we use the perturbation method with coupled the LTs of these operators to analyze their performance in solving some fractional differential equations. Furthermore, by constructing the error analysis, we test the practicability and usefulness of the method.

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Comparing the new fractional derivative operators involving exponential and Mittag-Leffler kernel

Cited by 56 publications

References 23 publications

An Analytical Investigation of Fractional-Order Biological Model Using an Innovative Technique

An Analytical Investigation of Fractional-Order Biological Model Using an Innovative Technique

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

Characterizations of two different fractional operators without singular kernel

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