Evidence for the poisson distribution for quasi-energies in the quantum kicked-rotator model

Abstract

A transformation on the two-dimensional torus which is related to the problem of limit distribution for the distance between the levels in the kicked-rotator model is considered. The first four moments of the r.w. which describe the numbers of visits of a point in a rectangle of measure e are calculated. It is shown that when e→0 they converge to the first four moments of a Poisson r.w.