Equivalence of phase-oscillator and integrate-and-fire models.
about
One node driving synchronisation.Approximate solution for frequency synchronization in a finite-size Kuramoto model.Firing rate equations require a spike synchrony mechanism to correctly describe fast oscillations in inhibitory networks.From Quasiperiodic Partial Synchronization to Collective Chaos in Populations of Inhibitory Neurons with Delay.Coupling functions: Universal insights into dynamical interaction mechanisms
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Equivalence of phase-oscillator and integrate-and-fire models.
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2015 nî lūn-bûn
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name
Equivalence of phase-oscillator and integrate-and-fire models.
@en
Equivalence of phase-oscillator and integrate-and-fire models.
@nl
type
label
Equivalence of phase-oscillator and integrate-and-fire models.
@en
Equivalence of phase-oscillator and integrate-and-fire models.
@nl
prefLabel
Equivalence of phase-oscillator and integrate-and-fire models.
@en
Equivalence of phase-oscillator and integrate-and-fire models.
@nl
P2860
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Equivalence of phase-oscillator and integrate-and-fire models.
@en
P2093
Michael Rosenblum
P2860
P304
P356
10.1103/PHYSREVE.91.042916
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P577
2015-04-29T00:00:00Z
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P818
1504.06126