Crisis in time-dependent dynamical systems
Abstract
Many dynamical systems operate in a fluctuating environment. However, even in low-dimensional setups, transitions and bifurcations have not yet been fully understood. In this Letter we focus on crises, a sudden flooding of the phase space due to the crossing of the boundary of the basin of attraction. We find that crises occur also in non-autonomous systems although the underlying mechanism is more complex. We show that in the vicinity of the transition, the escape probability scales as , where is the distance from the critical point, while is a model-dependent parameter. This prediction is tested and verified in a few different systems, including the Kuramoto model with inertia, where the crisis controls the loss of stability of a chimera state.
Cite
@article{arxiv.2503.13152,
title = {Crisis in time-dependent dynamical systems},
author = {Simona Olmi and Antonio Politi},
journal= {arXiv preprint arXiv:2503.13152},
year = {2025}
}
Comments
5 pages, 3 figures, accepted in Phys. Rev. Lett