NUMERICAL SOLUTION OF AN INTEGRO-DIFFERENTIAL EQUATION ARISING IN OSCILLATING MAGNETIC FIELDS

IF 0.3 Q4 MATHEMATICS, APPLIED Journal of the Korean Society for Industrial and Applied Mathematics Pub Date : 2016-09-25 DOI:10.12941/JKSIAM.2016.20.261
K. Parand, M. Delkhosh
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引用次数: 4

Abstract

In this paper, an integro-differential equation which arises in oscillating magnetic fields is studied. The generalized fractional order Chebyshev orthogonal functions (GFCF) collocation method used for solving this integral equation. The GFCF collocation method can be used in applied physics, applied mathematics, and engineering applications. The results of applying this procedure to the integro-differential equation with time-periodic coefficients show the high accuracy, simplicity, and efficiency of this method. The present method is converging and the error decreases with increasing collocation points.
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振荡磁场中积分-微分方程的数值解
本文研究了振荡磁场中出现的一类积分-微分方程。采用广义分数阶切比雪夫正交函数(GFCF)配点法求解该积分方程。GFCF配置方法可用于应用物理、应用数学和工程应用。将该方法应用于具有时间周期系数的积分-微分方程的结果表明,该方法具有较高的精度、简单性和高效性。该方法具有收敛性,且误差随搭配点的增加而减小。
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来源期刊
Journal of the Korean Society for Industrial and Applied Mathematics
Journal of the Korean Society for Industrial and Applied Mathematics MATHEMATICS, APPLIED-
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