Limits of the Formal Integrals of Motion

Abstract

We consider a formal (approximate) integral of motion in Hamiltonians of the form H=12(X2+Y2+ω12x2+ω22y2)+ε(η xy2+α x3+β x2y+γ y3) generalizing previous cases with β=γ=0. First we give the general form of this integral when ω1/ω2 is irrational and then we consider the case of commensurable frequencies. In particular we study the integrals for the resonances ω1/ω2=4/1, 5/1, 3/2, 4/3, 3/1 and 2/1. We also calculate the invariant curves and the orbits in the cases ω1/ω2=2/1 and 1/1 (with β=γ=0) and we compare the exact-numerical and the theoretical results predicted by the formal integral when βγ≠0. In the special case ω1/ω2=1/1 we find an integral when β=γ=0 and ηα≠0 or η=α=0 and βγ≠ 0, but this is not possible when ηαβγ≠ 0. However, we find that the invariant curves and the orbits can be approximated by a non-resonant integral with ω1/ω2=52/7=1.010….