Parabolic orbits in Celestial Mechanics: a functional-analytic approach

Abstract

We prove the existence of half-entire parabolic solutions, asymptotic to a prescribed central configuration, for the equation equation* x = ∇ U(x) + ∇ W(t,x), x ∈ Rd, equation* where d ≥ 2, U is a positive and positively homogeneous potential with homogeneity degree -α with α∈]0,2[, and W is a (possibly time-dependent) lower order term, for x +∞, with respect to U. The proof relies on a perturbative argument, after an appropriate formulation of the problem in a suitable functional space. Applications to several problems of Celestial Mechanics (including the N-centre problem, the N-body problem and the restricted (N+H)-body problem) are given.