Integrals of the motion for a nonlinear quantum oscillator

Ž 4 . Numerical experiments with a nonlinear x oscillator which has its harmonic frequency changing randomly with time reveal certain interesting features of its dynamics of quantum evolution. When s 0, the level populations are seen to oscillate. But, as the Ž . nonlinear coupling is switched on )

A solution of motion defined by a Hamiltonian function x = %(q\* , P!J + 1 ~"Kdqk, , Plc ; 0 k = 1, 2,..., N n=\* of a system in time-dependent fields, is found by the use of power series expansions in a perturbation parameter. The solution is in the form of 2N independent integrals of motion, the p

The scope of this paper is evaluating an oscillation system with nonlinearities, using a periodic solution called amplitudefrequency formulation, such as the motion of a rigid rod rocking back. The approach proposes a choice to overcome the difficulty of computing the periodic behavior of the oscill