%0 Journal Article %1 Chirikov1979263 %A Chirikov, Boris V %D 1979 %J Physics Reports %K ODEs analysis chaos classical mathematics mechanics physics qualitative unread %N 5 %P 263 - 379 %R 10.1016/0370-1573(79)90023-1 %T A universal instability of many-dimensional oscillator systems %U http://www.sciencedirect.com/science/article/pii/0370157379900231 %V 52 %X The purpose of this review article is to demonstrate via a few simple models the mechanism for a very general, universal instability - the Arnold diffusion—which occurs in the oscillating systems having more than two degrees of freedom. A peculiar feature of this instability results in an irregular, or stochastic, motion of the system as if the latter were influenced by a random perturbation even though, in fact, the motion is governed by purely dynamical equations. The instability takes place generally for very special initial conditions (inside the so-called stochastic layers) which are, however, everywhere dense in the phase space of the systsm. The basic and simplest one of the models considered is that of a pendulum under an external periodic perturbation. This model represents the behavior of nonlinear oscillations near a resonance, including the phenomenon of the stochastic instability within the stochastic layer of resonance. All models are treated both analytically and numerically. Some general regulations concerning the stochastic instability are presented, including a general, semi-quantitative method-the overlap criterion—to estimate the conditions for this stochastic instability as well as its main characteristics.

@article{Chirikov1979263, abstract = {The purpose of this review article is to demonstrate via a few simple models the mechanism for a very general, universal instability - the Arnold diffusion—which occurs in the oscillating systems having more than two degrees of freedom. A peculiar feature of this instability results in an irregular, or stochastic, motion of the system as if the latter were influenced by a random perturbation even though, in fact, the motion is governed by purely dynamical equations. The instability takes place generally for very special initial conditions (inside the so-called stochastic layers) which are, however, everywhere dense in the phase space of the systsm. The basic and simplest one of the models considered is that of a pendulum under an external periodic perturbation. This model represents the behavior of nonlinear oscillations near a resonance, including the phenomenon of the stochastic instability within the stochastic layer of resonance. All models are treated both analytically and numerically. Some general regulations concerning the stochastic instability are presented, including a general, semi-quantitative method-the overlap criterion—to estimate the conditions for this stochastic instability as well as its main characteristics.}, added-at = {2013-03-19T01:48:04.000+0100}, author = {Chirikov, Boris V}, biburl = {https://www.bibsonomy.org/bibtex/2723984b31d1a58fba361bc555be3803e/drmatusek}, doi = {10.1016/0370-1573(79)90023-1}, interhash = {fdb6e39d773e2853fcbf92a4a1f58e24}, intrahash = {723984b31d1a58fba361bc555be3803e}, issn = {0370-1573}, journal = {Physics Reports}, keywords = {ODEs analysis chaos classical mathematics mechanics physics qualitative unread}, month = may, number = 5, pages = {263 - 379}, timestamp = {2013-03-19T01:48:04.000+0100}, title = {A universal instability of many-dimensional oscillator systems}, url = {http://www.sciencedirect.com/science/article/pii/0370157379900231}, volume = 52, year = 1979 }