A first integral to the partially averaged Newtonian potential of the three-body problem

Abstract: We consider the partial average i.e., the Lagrange average with respect to just one of the two mean anomalies, of the Newtonian part of the perturbing function in the three-body problem Hamiltonian. We prove that such a partial average exhibits a non-trivial first integral. We show that this integral is fully responsible of certain cancellations in the averaged Newtonian potential, including a property noticed by Harrington in the 60s. We also highlight its joint rôle (together with certain symmetries) in the … Show more

“…Here we have used that F ε does not depend explicitly on Λ, since both U and E depend on Λ only via G Λ . We claim that 5 Beware not to confuse the coordinate γ in (26) with its homonymous in (15). The latter is a cyclic coordinate for the Hamiltonians H i in (2) and (5), and hence has no rôle in the paper.…”

“…In the planar case, the relation (23) becomes very special. Instead of U and E, it is convenient to switch to the functions if a = a(Λ) is as in (15). We rewrite relation (23) as…”

“…To prove Proposition 3.1, we need to recall the following result from [15]. Then f renormalizably integrable by g through f , and f can be chosen to be…”

“…The formula in (31) (and its consequences below) is pretty specific for the planar case. In [15,Equation (49)] we proposed a general formula (holding for the planar and the spatial case), which, unfortunately, does not seem equally exploitable.…”

Perihelion Librations in the Secular Three-Body Problem

“…Here we have used that F ε does not depend explicitly on Λ, since both U and E depend on Λ only via G Λ . We claim that 5 Beware not to confuse the coordinate γ in (26) with its homonymous in (15). The latter is a cyclic coordinate for the Hamiltonians H i in (2) and (5), and hence has no rôle in the paper.…”

“…In the planar case, the relation (23) becomes very special. Instead of U and E, it is convenient to switch to the functions if a = a(Λ) is as in (15). We rewrite relation (23) as…”

“…To prove Proposition 3.1, we need to recall the following result from [15]. Then f renormalizably integrable by g through f , and f can be chosen to be…”

“…The formula in (31) (and its consequences below) is pretty specific for the planar case. In [15,Equation (49)] we proposed a general formula (holding for the planar and the spatial case), which, unfortunately, does not seem equally exploitable.…”

Perihelion Librations in the Secular Three-Body Problem

“…

We discuss dynamical aspects of an analysis of the two-centre problem started in [15]. The perturbative nature of our approach allows us to foresee applications to the three-body problem.

…”

Euler integral and perihelion librations

A New Analysis of the Three-Body Problem