We consider a class of parametrically forced Hamiltonian systems with
one-and-a-half degrees of freedom and study the stability of the dynamics when
the frequency of the forcing is relatively high or low. We show that, provided
the frequency of the forcing is sufficiently high, KAM theorem may be applied
even when the forcing amplitude is far away from the perturbation regime. A
similar result is obtained for sufficiently low frequency forcing, but in that
case we need the amplitude of the forcing to be not too large; however we are
still able to consider amplitudes of the forcing which are outside of the
perturbation regime. Our results are illustrated by means of numerical
simulations for the system of a forced cubic oscillator. In addition, we find
numerically that the dynamics are stable even when the forcing amplitude is
very large (beyond the range of validity of the analytical results), provided
the frequency of the forcing is taken correspondingly low.Comment: 12 pages, 3 figures, 2 table
