On the Solution of an Imprecisely Defined Nonlinear Time-Fractional Dynamical Model of Marriage

Jena, Rajarama Mohan; Chakraverty, Snehashish; Băleanu, Dumitru

doi:10.3390/math7080689

Cited by 30 publications

(15 citation statements)

References 26 publications

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“…Putting Equation 6.6 into the above equations and continuing similarly, we can compute all the values of R n , J n f g ∞ n = 0 . So the solution of the Equation 7.1 is written as Using the values of the parameters as given in Jena et al 7 and Goyal et al, 8 we get the following expressions:…”

Section: Application Of the Present Methods With Abc Fractional Derimentioning

confidence: 99%

“…As such, researchers are recently studying various interpersonal relationship dynamic models. [4][5][6][7][8] The most recent love model is the Romeo and Juliet model. 3 Assume that we need to calculate Romeo's love or hate for Juliet R(t) and Juliet's love or hate for Romeo J(t) at any instance of time t. Positive values indicate love, and negative values signify hatred.…”

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confidence: 99%

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Analysis of time‐fractional dynamical model of romantic and interpersonal relationships with non‐singular kernels: A comparative study

Jena

Chakraverty

Băleanu

et al. 2020

Math Methods in App Sciences

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The analysis of interpersonal relationships has started to become popular in the last few decades. Interpersonal relationships exist in many ways, including family, friendship, job, and clubs. In this manuscript, we have implemented the homotopy perturbation Elzaki transform method to obtain the solutions of romantic and interpersonal relationships model involving timefractional-order derivatives with non-singular kernels. The present method is the combination of the classical homotopy perturbation method and the Elzaki transform. This method offers a rapidly convergent series of solutions. The present approach explores the dynamics of love between couples. Validation and usefulness of the method are incorporated with new fractional-order derivatives with exponential decay law and with general Mittag-Leffler law. Obtained results are compared with the established solution defined in the Caputo sense. Further, a comparative study among Caputo and newly defined fractional derivatives are discussed.

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Section: Application Of the Present Methods With Abc Fractional Derimentioning

confidence: 99%

mentioning

confidence: 99%

Analysis of time‐fractional dynamical model of romantic and interpersonal relationships with non‐singular kernels: A comparative study

Jena

Chakraverty

Băleanu

et al. 2020

Math Methods in App Sciences

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“…In order to demonstrate the elementary idea of RDTM, let us take the nonlinear PDE of the form as follows with initial condition (IC) [35,38,39] Original function Transformed form…”

Section: Fractional Reduced Differential Transform Methodsmentioning

confidence: 99%

On the solution of time-fractional coupled system of partial differential equations

Jena

Chakraverty

2019

SN Appl. Sci.

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In this research, a newly proposed Laplace Padé reduced differential transform method (LPRDTM) has been applied for solving a coupled system of partial differential equations with time-fractional derivatives. Here the fractional derivatives are defined in the Caputo sense. This is a hybrid technique which is the coupling of laplace transform, Padé approximant, and the reduced differential transform method. Two examples are solved using the present method, and the obtained results are compared with the analytical solutions in terms of the tables, which recommend that LPRDTM provides exact solutions with a few iterations. The main benefit of applying this method is that it does not require any assumption, perturbation, and discretization for solving the governing fractional PDEs. Also, the computation time of this method is less compared to other techniques.

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“…Some essential investigation on FC has been analyzed in the past few years, and different books have been published by many authors such as Baleanu et al, 9 Miller and Ross, 10 Kilbas et al, 11 and Podlubny. 12 Several approximate and analytical techniques have been established for such type of problems (see other studies [13][14][15][16][17][18][19][20][21][22][23][24][25][26] ).…”

Section: Outline and Motivationmentioning

confidence: 99%

On the solution of time‐fractional dynamical model of Brusselator reaction‐diffusion system arising in chemical reactions

2020

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Fractional Brusselator reaction‐diffusion system (BRDS) is used for modeling of specific chemical reaction‐diffusion processes. It may be noted that numerous models in nonlinear science are defined by fractional differential equations (FDEs) in which an unknown function appears under the operation of a fractional‐order derivative. Even though many researchers have studied the applicability and practicality of this model, the analytical approach of this model is rarely found in the literature. In this investigation, a novel semi‐analytical technique called fractional reduced differential transform method (FRDTM) has been applied to solve the present model, which is characterized by the time‐fractional derivative (FD). Obtained outcomes are compared with the solution of other existing methods for a particular case. Also, the convergence analysis of this model has been studied here.

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On the Solution of an Imprecisely Defined Nonlinear Time-Fractional Dynamical Model of Marriage

Cited by 30 publications

References 26 publications

Analysis of time‐fractional dynamical model of romantic and interpersonal relationships with non‐singular kernels: A comparative study

Analysis of time‐fractional dynamical model of romantic and interpersonal relationships with non‐singular kernels: A comparative study

On the solution of time-fractional coupled system of partial differential equations

On the solution of time‐fractional dynamical model of Brusselator reaction‐diffusion system arising in chemical reactions

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