Analytic inversion of closed form solutions of the satellite's J2 problem

Abstract

This report provides some closed form solutions -- and their inversion -- to a satellite's bounded motion on the equatorial plane of a spheroidal attractor (planet) considering the J2 spherical zonal harmonic. The equatorial track of satellite motion -- assuming the co-latitude fixed at π/2 -- is investigated: the relevant time laws and trajectories are evaluated as combinations of elliptic integrals of first, second, third kind and Jacobi elliptic functions. The new feature of this report is: from the inverse t = t(c) to get the period T of some functions c(t) of mechanical interest and then to construct the relevant c(t) expansion in Fourier series, in such a way performing the inversion. Such approach -- which led to new formulations for time laws of a J2 problem -- is benchmarked by applying it to the basic case of keplerian motion, finding again the classic results through our different analytic path. Keywords: J2 problem, bounded satellite motion, Fourier series, elliptic integrals, Jacobi elliptic functions.