Conformable Derivatives in Laplace Equation and Fractional Fourier Series Solution

International Journal of Science Annals Pub Date : 2019-11-07 DOI:10.21467/ias.9.1.1-7

R. Pashaei, M. Asgari, A. Pishkoo

引用次数: 4

Abstract

In this paper the solution of conformable Laplace equation, \frac{\partial^{\alpha}u(x,y)}{\partial x^{\alpha}}+ \frac{\partial^{\alpha}u(x,y)}{\partial y^{\alpha}}=0, where 1 < α ≤ 2 has been deduced by using fractional fourier series and separation of variables method. For special cases α =2 (Laplace's equation), α=1.9, and α=1.8 conformable fractional fourier coefficients have been calculated. To calculate coefficients, integrals are of type "conformable fractional integral".

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拉普拉斯方程的合形导数与分数阶傅立叶级数解

本文利用分数阶傅立叶级数和分离变量法，导出了1 < α≤2的适形拉普拉斯方程\frac{\partial^{\alpha}u(x,y)}{\partial x^{\alpha}} + \frac{\partial^{\alpha}u(x,y)}{\partial y^{\alpha}} =0的解。对于α= 2(拉普拉斯方程)、α=1.9和α=1.8的特殊情况，计算了符合的分数傅立叶系数。为了计算系数，积分采用“适形分数积分”类型。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

International Journal of Science Annals

自引率

0.00%

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审稿时长

3 weeks