Title of article
A numerical scheme for solving time-fractional Bessel differential equations
Author/Authors
Tavan ، Saber Department of Mathematics - Islamic Azad University, Tabriz Branch , Jahangiri Rad ، Mohammad Department of Mathematics - Islamic Azad University, Tabriz Branch , Salimi Shamloo ، Ali Department of Mathematics - Islamic Azad Islamic Azad University, Shabestar branch , Mahmoudi ، Yaghoub Department of Mathematics - Islamic Azad University, Tabriz Branch
From page
1097
To page
1114
Abstract
The object of this paper devotes on offering an indirect scheme based on time-fractional Bernoulli functions in the sense of Rieman-Liouville fractional derivative which ends up to the high credit of the obtained approximate fractional Bessel solutions. In this paper, the operational matrices of fractional Rieman-Liouville integration for Bernoulli polynomials are introduced. Utilizing these operational matrices along with the properties of Bernoulli polynomials and the least squares method, the fractional Bessel differential equation converts into a nonlinear system of algebraic. To solve these nonlinear algebraic equations which are a prominent the problem, there is a need to employ Newton s iterative method. In order to elaborate the study, the synergy of the proposed method is investigated and then the accuracy and the efficiency of the method are clearly evaluated by presenting numerical results.
Keywords
Fractional , order differential equation , Caputo and Rieman , Liouville fractional derivative and integral , Convergence analysis , Bernoulli functions , Least square method
Journal title
Computational Methods for Differential Equations
Journal title
Computational Methods for Differential Equations
Record number
2729499
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