We analyze a pair of delay-coupled FitzHugh–Nagumo oscillators exhibiting in-out intermittency as a part of the generating mechanism of extreme events. We study in detail the characteristics of in-out intermittency and identify the invariant subsets involved – a saddle fixed point and a saddle periodic orbit – neither of which are chaotic as in the previously reported cases of in-out intermittency. Based on the analysis of a periodic attractor possessing in-out dynamics, we can characterize the approach to the invariant synchronization manifold and the spiralling out to the saddle periodic orbit with subsequent ejection from the manifold. Due to the striking similarities, this analysis of in-out dynamics also explains in-out intermittenc
We show that a nonlinear coupling with delayed feedback between two limit-cycle oscillators can lead...
We consider the behavior of Stuart-Landau oscillators as generic limit-cycle oscillators when they a...
In this paper, bifurcation trees of periodic motions in a periodically forced, time-delayed, hardeni...
International audienceIn this paper we characterized intermittent transitions from temporal ă chaos ...
The van der Pol–FitzHugh–Nagumo neuron model with inertia was shown to exhibit a chaotic mixed-mode ...
We study intermittent lag synchronization in a system of two identical mutually coupled Duffing osci...
We study collective behaviors of diffusively coupled oscillators which exhibit out-of-phase synchron...
We present a system of two coupled identical chaotic electronic circuits that exhibit a blowout bifu...
Abstract. Chains of N FitzHugh–Nagumo oscillators with a gradient in natural frequencies and strong ...
1. Loss of chaos synchronization in presence of a small noise or parameter mismatch. 2. Bifurcations...
We show that a nonlinear coupling with delayed feedback between two limit-cycle oscillators can lead...
We examine some properties of attractors for symmetric dynamical systems that show what we refer to ...
Chaotic time series can exhibit rare bursts of “periodic” motion. We discuss one mechanism for this ...
Abstract—In this study, a complex behavior in two coupled chaotic circuits related with intermittenc...
Interaction via pulses is common in many natural systems, especially neuronal. In this article we st...
We show that a nonlinear coupling with delayed feedback between two limit-cycle oscillators can lead...
We consider the behavior of Stuart-Landau oscillators as generic limit-cycle oscillators when they a...
In this paper, bifurcation trees of periodic motions in a periodically forced, time-delayed, hardeni...
International audienceIn this paper we characterized intermittent transitions from temporal ă chaos ...
The van der Pol–FitzHugh–Nagumo neuron model with inertia was shown to exhibit a chaotic mixed-mode ...
We study intermittent lag synchronization in a system of two identical mutually coupled Duffing osci...
We study collective behaviors of diffusively coupled oscillators which exhibit out-of-phase synchron...
We present a system of two coupled identical chaotic electronic circuits that exhibit a blowout bifu...
Abstract. Chains of N FitzHugh–Nagumo oscillators with a gradient in natural frequencies and strong ...
1. Loss of chaos synchronization in presence of a small noise or parameter mismatch. 2. Bifurcations...
We show that a nonlinear coupling with delayed feedback between two limit-cycle oscillators can lead...
We examine some properties of attractors for symmetric dynamical systems that show what we refer to ...
Chaotic time series can exhibit rare bursts of “periodic” motion. We discuss one mechanism for this ...
Abstract—In this study, a complex behavior in two coupled chaotic circuits related with intermittenc...
Interaction via pulses is common in many natural systems, especially neuronal. In this article we st...
We show that a nonlinear coupling with delayed feedback between two limit-cycle oscillators can lead...
We consider the behavior of Stuart-Landau oscillators as generic limit-cycle oscillators when they a...
In this paper, bifurcation trees of periodic motions in a periodically forced, time-delayed, hardeni...