Application of Residual Power Series Method for the Solution of Time-fractional Schrödinger Equations in One-dimensional Space

The object of this article is to present the computational solution of the time-fractional Schrödinger equation subject to given constraint condition based on the generalized Taylor series formula in the Caputo sense. The algorithm methodology is based on construct a multiple fractional power series...

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Bibliographic Details
Published inFundamenta informaticae Vol. 166; no. 2; pp. 87 - 110
Main Author Abu Arqub, Omar
Format Journal Article
LanguageEnglish
Published London, England SAGE Publications 01.01.2019
Sage Publications Ltd
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ISSN0169-2968
1875-8681
DOI10.3233/FI-2019-1795

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Summary:The object of this article is to present the computational solution of the time-fractional Schrödinger equation subject to given constraint condition based on the generalized Taylor series formula in the Caputo sense. The algorithm methodology is based on construct a multiple fractional power series solution in the form of a rabidly convergent series with minimum size of calculations using symbolic computation software. The proposed technique is fully compatible with the complexity of this problem and obtained results are highly encouraging. Efficacious computational experiments are provided to guarantee the procedure and to illustrate the theoretical statements of the present algorithm in order to show its potentiality, generality, and superiority for solving such fractional equation. Graphical results and numerical comparisons are presented and discussed quantitatively to illustrate the solution.
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ISSN:0169-2968
1875-8681
DOI:10.3233/FI-2019-1795