Finding the Exact Solution of Kepler’s Equation for an Elliptical Satellite Orbit Using the First Kind Bessel Function

Q4 Earth and Planetary Sciences
R. Ibrahim, Abdul-Rahman H. Saleh
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引用次数: 0

Abstract

     In this study, the first kind Bessel function was used to solve Kepler equation for an elliptical orbiting satellite. It is a classical method that gives a direct solution for calculation of the eccentric anomaly. It was solved for one period from (M=0-360)° with an eccentricity of (e=0-1) and the number of terms from (N=1-10). Also, the error in the representation of the first kind Bessel function was calculated. The results indicated that for eccentricity of (0.1-0.4) and (N = 1-10), the values of eccentric anomaly gave a good result as compared with the exact solution. Besides, the obtained eccentric anomaly values were unaffected by increasing the number of terms (N = 6-10) for eccentricities (0.8 and 0.9). The Bessel function's solution appeared to be close to the exact solution for eccentricity of 1 and more than 10 number of terms. Finally, the representation of the first kind Bessel function J1(x) was closer to the exact representation only for eccentricity 0.5 and (N=1-10).
利用第一类贝塞尔函数寻找椭圆卫星轨道的开普勒方程精确解
本研究使用第一类贝塞尔函数求解椭圆轨道卫星的开普勒方程。这是一种经典方法,可直接求解偏心异常的计算结果。在偏心率为(e=0-1)和项数为(N=1-10)的情况下,对一个周期(M=0-360)°进行了求解。此外,还计算了第一类贝塞尔函数的表示误差。结果表明,当偏心率为(0.1-0.4)和(N=1-10)时,偏心异常值与精确解相比结果良好。此外,对于偏心率(0.8 和 0.9),增加项数(N = 6-10)所得到的偏心异常值也不受影响。当偏心率为 1 且项数超过 10 时,贝塞尔函数的解似乎接近精确解。最后,只有在偏心率为 0.5 和(N=1-10)时,第一类贝塞尔函数 J1(x) 的表示才更接近精确表示。
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
Iraqi Journal of Science
Iraqi Journal of Science Chemistry-Chemistry (all)
CiteScore
1.50
自引率
0.00%
发文量
241
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