Аннотация:
In this work an exhaustive numerical and analytical investigation of the dynamics
of a bi-parametric symplectic map, the so-called rational standard map, at moderate-to-large
values of the amplitude parameter is addressed. After reviewing the model, a discussion
concerning an analytical determination of the maximum Lyapunov exponent is provided
together with thorough numerical experiments. The theoretical results are obtained in the
limit of a nearly uniform distribution of the phase values. Correlations among phases lead to
departures from the expected estimates. In this direction, a detailed study of the role of stable
periodic islands of periods 1, 2 and 4 is included. Finally, an experimental relationship between
the Lyapunov and instability times is shown, while an analytical one applies when correlations
are irrelevant, which is the case, in general, for large values of the amplitude parameter.
Ключевые слова:analytical and numerical methods, periodic orbits, chaos, area-preserving maps.