In this paper, we provide sufficient conditions for the existence of periodic solutions emerging of the equilibrium points of the spatial Hill lunar problem having the following equations of motion: d(2)x/dt(2) - 2dy/dt - 9x = epsilon F-1 (t, x, dx/dt, y, dy/dt), d(2)y/dt(2) + 2dx/ dt + 3y = epsilon F-2 (t, x, dx/ dt, y, dy/dt), d(2)z/dt(2) + 4z = epsilon F-3 (t, x, dx/dt, y, dy/dt). E is a small parameter and F-i, i {1, 2, 3}, are smooth periodic functions in t which define a perturbation in resonance p:q with some of the periodic solutions of the spatial Hill lunar problem being p and q positive relatively prime integers.

• 出版日期2017-9