Classical and quantum chaotic behaviors of two colliding harmonic oscillators

Abstract: We have systematically studied both classical and quantum chaotic behaviors of two colliding harmonic oscillators. The classical case falls in Kolmogorov-Arnold-Moser class. It is shown that there exists an energy threshold, above which the system becomes nonintegrable. For some values of the initial energy near the threshold, we have found that the ratio of frequencies of the two oscillators affects the Poincaré sections significantly. The largest Lyapunov character exponent depends linearly on the ratio of f… Show more

“…As already discussed in previous studies of the Ding-Dong model 8,23 , general dynamical regimes are typically chaotic. A minimal chaotic state must include three particles (because of the additional conservation law, for a more general non-symmetric situation chaos is possible for two colliding oscillators 33 ), thus two-particle regimes are periodic or quasiperiodic.…”

Spreading of energy in the Ding-Dong model

“…As already discussed in previous studies of the Ding-Dong model 8,23 , general dynamical regimes are typically chaotic. A minimal chaotic state must include three particles (because of the additional conservation law, for a more general non-symmetric situation chaos is possible for two colliding oscillators 33 ), thus two-particle regimes are periodic or quasiperiodic.…”

Spreading of energy in the Ding-Dong model

Sensitivity at the degenerate points of energy levels in a quantum system with nonintegrable perturbation