Abstract
We consider discrete-time one-dimensional random dynamical systems with bounded noise, which generate an associated set-valued dynamical system. We provide necessary and sufficient conditions for a discontinuous bifurcation of a minimal invariant set of the set-valued dynamical system in terms of the derivatives of the so-called extremal maps. We propose an algorithm for reconstructing the derivatives of the extremal maps from a time series that is generated by iterations of the original random dynamical system. We demonstrate that the derivative reconstructed for different parameters can be used as an early-warning signal to detect an upcoming bifurcation, and apply the algorithm to the bifurcation analysis of the stochastic return map of the Koper model, which is a three-dimensional multiple time scale ordinary differential equation used as prototypical model for the formation of mixed-mode oscillation patterns. We apply our algorithm to data generated by this map to detect an upcoming transition.
Original language | English |
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Pages (from-to) | 58-77 |
Number of pages | 20 |
Journal | Journal of Mathematical Analysis and Applications |
Volume | 464 |
Issue number | 1 |
DOIs | |
State | Published - 1 Aug 2018 |
Keywords
- Bifurcation
- Early-warning signal
- Fast-slow system
- Mixed-mode oscillations
- Random dynamical system
- Set-valued dynamical system