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Revisiting the Dynamics of Two-Body Problem in the Framework of the Continued Fraction Potential

Sergey V. Ershkov, Ghada F. Mohamdien, M. Javed Idrisi, Elbaz I. Abouelmagd

2024Mathematics14 citationsDOIOpen Access PDF

Abstract

In this analytical study, a novel solving method for determining the precise coordinates of a mass point in orbit around a significantly more massive primary body, operating within the confines of the restricted two-body problem (R2BP), has been introduced. Such an approach entails the utilization of a continued fraction potential diverging from the conventional potential function used in Kepler’s formulation of the R2BP. Furthermore, a system of equations of motion has been successfully explored to identify an analytical means of representing the solution in polar coordinates. An analytical approach for obtaining the function t = t(r), incorporating an elliptic integral, is developed. Additionally, by establishing the inverse function r = r(t), further solutions can be extrapolated through quasi-periodic cycles. Consequently, the previously elusive restricted two-body problem (R2BP) with a continued fraction potential stands fully and analytically solved.

Topics & Concepts

Three-body problemFraction (chemistry)Kepler problemFunction (biology)Two-body problemCelestial mechanicsInverse problemOrbit (dynamics)Mathematicsn-body problemPhysicsMathematical analysisApplied mathematicsClassical mechanicsOrganic chemistryAerospace engineeringEngineeringChemistryBiologyEvolutionary biologyStellar, planetary, and galactic studiesAstro and Planetary ScienceSpacecraft Dynamics and Control
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