Determination of Eccentric Anomaly for Kepler’s Satellite Orbit Using Perturbation-Based Seeded Secant Iteration Scheme

British Journal of Computer, Networking and Information Technology Pub Date : 2021-06-30 DOI:10.52589/bjcnit-m7xkp8rv

H. Dike, A. Isaac

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Abstract

In this paper, the determination of eccentric anomaly (E) for Kepler’s satellite orbit using Perturbation-Based Seeded Secant (PBSS) iteration algorithm is presented. The solution is meant for Kepler’s orbit with the value of eccentricity (e) in the range 0 ≤ e ≤ 1. Such orbits are either circular or elliptical. The demonstration of the applicability of the PBSS iteration is presented using sample numerical examples with different values of mean anomaly (M) and eccentricity (e). The summary of the results of E for M = 30° and e in the range 0.001 ≤ e ≤1 showed that the convergence cycle (n) increases as e increases. Particularly, n increased from 2 at e = 0.01 to n = 8 at e =1. The implication is that it takes more iterations to arrive at the value of E with the desired accuracy or error performance (which in this case is set to 10^(-12)). Another implication is that a good choice of the initial value of E is essential especially as the value of e increases. As such, effort should be made to develop a means of estimating the initial value of E which will reduce the convergence cycle for higher values of e.

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基于微扰的种子割线迭代法确定开普勒卫星轨道偏心异常

提出了利用基于微扰的种子割线(PBSS)迭代算法确定开普勒卫星轨道偏心异常(E)的方法。求解偏心率e在0≤e≤1范围内的开普勒轨道。这样的轨道不是圆形就是椭圆形。以不同的平均异常(M)和偏心率(e)为例，对PBSS迭代的适用性进行了论证。对M = 30°和e在0.001≤e≤1范围内的结果进行了总结，表明收敛周期(n)随着e的增大而增大。特别是，n从e = 0.01时的2增加到e =1时的n = 8。这意味着需要更多的迭代才能达到期望的精度或误差性能(在本例中设置为10^(-12))。另一个含义是，E的初始值的良好选择是至关重要的，特别是当E的值增加时。因此，应该努力开发一种估计E初始值的方法，以减少较高E值的收敛周期。

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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British Journal of Computer, Networking and Information Technology

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