A. G. Ariwayo scite author profile

A. G. Ariwayo

2Publications

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54Citation Statements Given

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Adekunle Ajasin University

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On the Convergence of LHAM and its Application to Fractional Generalised Boussinesq Equations for Closed Form Solutions

Ajibola

Oghre

Ariwayo

et al. 2021

EJMS

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By fractional generalised Boussinesq equations we mean equations of the form \begin{equation} \Delta\equiv D_{t}^{2\alpha}-[\mathcal{N}(u)]_{xx}-u_{xxxx}=0, \: 0<\alpha\le1,\label{main}\nonumber \end{equation} where $\mathcal{N}(u)$ is a differentiable function and $\mathcal{N}_{uu}\ne0$ (to ensure nonlinearity). In this paper we lay emphasis on the cubic Boussinesq and Boussinesq-like equations of fractional order and we apply the Laplace homotopy analysis method (LHAM) for their rational and solitary wave solutions respectively. It is true that nonlinear fractional differential equations are often difficult to solve for their {\em exact} solutions and this single reason has prompted researchers over the years to come up with different methods and approach for their {\em analytic approximate} solutions. Most of these methods require huge computations which are sometimes complicated and a very good knowledge of computer aided softwares (CAS) are usually needed. To bridge this gap, we propose a method that requires no linearization, perturbation or any particularly restrictive assumption that can be easily used to solve strongly nonlinear fractional differential equations by hand and simple computer computations with a very quick run time. For the closed form solution, we set $\alpha =1$ for each of the solutions and our results coincides with those of others in the literature.

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Descriptions of fractional coefficients of Jacobi polynomial expansions

Awonusika

Ariwayo

2022

J Anal

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A. G. Ariwayo

On the Convergence of LHAM and its Application to Fractional Generalised Boussinesq Equations for Closed Form Solutions

Descriptions of fractional coefficients of Jacobi polynomial expansions

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