Partial Reset in Pulse-Coupled Oscillators
Christoph Kirst, Marc Timme
TL;DR
This paper investigates how partial resets in pulse-coupled oscillators can induce desynchronization, providing analytical conditions for stability and demonstrating robustness of the transition to asynchrony.
Contribution
It introduces a partial reset mechanism in pulse-coupled models and analytically characterizes its role in desynchronization transitions.
Findings
Partial reset acts as a desynchronization mechanism.
Sequence of bifurcations from synchrony to asynchrony with increasing reset strength.
Desynchronization transition is robust and analytically predictable.
Abstract
Pulse-coupled threshold units serve as paradigmatic models for a wide range of complex systems. When the state variable of a unit crosses a threshold, the unit sends a pulse that is received by other units, thereby mediating the interactions. At the same time, the state variable of the sending unit is reset. Here we study pulse-coupled models with a reset that may be partial only and is mediated by a partial reset function. Such a partial reset characterizes intrinsic physical or biophysical features of a unit (e.g., resistive coupling between dendrite and soma of compartmental neurons) and at the same time makes possible a rigorous mathematical investigation of the collective network dynamics. The partial reset acts as a desynchronization mechanism. For all-to-all pulse-coupled oscillators an increase in the strength of the partial reset causes a sequence of desynchronizing…
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Taxonomy
TopicsNeural dynamics and brain function · Nonlinear Dynamics and Pattern Formation · stochastic dynamics and bifurcation