Journal ArticleDOI
Analytical approach using KS elements to short-term orbit predictions including J 2
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In this paper, the Earth's zonal harmonic J2 perturbation is considered, and analytical solutions using KS elements are derived for short-term orbit computations, where only two of the nine KS element equations are integrated analytically due to the reasons of symmetry.Abstract:
Analytical solutions using KS elements are derived. The perturbation considered is the Earth's zonal harmonic J
2. The series expansions include terms of fourth power in the eccentricity. Only two of the nine KS element equations are integrated analytically due to the reasons of symmetry. The analytical solution is suitable for short-term orbit computations. Numerical studies show that reasonably good estimates of the orbital elements can be obtained in one step of 10 to 30 degrees of eccentric anomaly for near-Earth orbits of moderate eccentricity. For application purposes, the analytical solution can be effectively used for onboard computation in the navigation and guidance packages, where the modelling of J
2 effect becomes necessary.read more
Citations
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Journal ArticleDOI
The KS-transformation revisited
TL;DR: In this article, it was shown that the Kustaanheimo-stiefel regularizing transformation for the perturbed Kepler motion is deeply rooted to the Keplerian orbital elements as to yield the position vector of a particle on the osculating orbit as the effect of a peculiar roto-dilatation in the physical Euclidean space.
Journal ArticleDOI
Analytical short-term orbit predictions withJ 3 andJ 4 in terms of KS elements
TL;DR: In this article, an analytical theory for short-term orbit motion of satellite orbits with Earth's zonal harmonics was developed in terms of KS elements, which can be used for accurate onboard computation of state vector in navigation and guidance packages.
Analytical orbit predictions with air drag using K-S uniformly regular canonical elements
M. Xavier James Raj,R.K. Sharma +1 more
TL;DR: In this article, a nonsingular analytical theory for the motion of near Earth satellite orbits with the air drag effect is developed for long term motion in terms of the KS uniformly regular canonical elements by a series expansion method, by assuming the atmosphere to be symmetrically spherical with constant density scale height.
Journal ArticleDOI
Analytical orbit predictions with air drag using KS uniformly regular canonical elements
TL;DR: In this paper, a nonsingular analytical theory for the motion of near Earth satellite orbits with the air drag effect is developed for long term motion in terms of the KS uniformly regular canonical elements by a series expansion method, by assuming the atmosphere to be symmetrically spherical with constant density scale height.
References
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Journal ArticleDOI
Perturbation theory of Kepler motion based on spinor regularization.
E. Stiefel,P. Kustaanheimo +1 more
TL;DR: In this article, Kustaanheimo et al. developed a regularization of Kepler motion using a simple mapping of a four-dimensional space R* onto a 3D space Ä, where the equations of any undisturbed Kepler motion are linear differential equations.
Journal ArticleDOI
E. L. Stiefel und G. Scheifele, Linear and Regular Celestial Mechanics. (Die Grundlehren d. math. Wissenschaften, Band 174). IX + 301 S. m. 18 Fig. Berlin/Heidelberg/New York 1971. Springer‐Verlag. Preis geb. DM 68,—
Journal ArticleDOI
Long-term orbit computations with KS uniformly regular canonical elements with oblateness
TL;DR: In this paper, a fixed step-size fourth-order Runge-Kutta-Gill method is employed for numerical integration of the canonical equations with Earth's oblateness.