Add to ORKGWe investigate the transition to synchronization in the Kuramoto model with bimodal distributions of the natural frequencies. Previous studies have concluded that the model exhibits a hysteretic phase transition if the bimodal distribution is close to a unimodal one, due to the shallowness the central dip. Here we show that proximity to the unimodal-bimodal border does not necessarily imply hysteresis when the width, but not the depth, of the central dip tends to zero. We draw this conclusion from a detailed study of the Kuramoto model with a suitable family of bimodal distributions
Synchronization of coupled simple harmonic oscillators is a well-studied problem in advanced undergr...
We consider the inertial Kuramoto model of N globally coupled oscillators characterized by both thei...
The Kuramoto model is a paradigmatic tool for studying the dynamics of collective behavior in large ...
We investigate the transition to synchronization in the Kuramoto model with bimodal distributions of...
The Kuramoto model of a network of coupled phase oscillators exhibits a first-order phase transition...
The Kuramoto model of a network of coupled phase oscillators exhibits a first-order phase transition...
We discuss the influence of small phase lags on the synchronization transitions in the Kuramoto mode...
We discuss the influence of small phase lags on the synchronization transitions in the Kuramoto mode...
We discuss the influence of small phase lags on the synchronization transitions in the Kuramoto mode...
We investigate the transition to synchrony in a system of phase oscillators that are globally couple...
We investigate the transition to synchrony in a system of phase oscillators that are globally couple...
The phenomenon of spontaneous synchronization, particularly within the framework of the Kuramoto mod...
Synchronization phenomena in large populations of interacting elements are the subject of intense re...
We analyze the synchronization dynamics of the thermodynamically large systems of globally coupled p...
In this work, we study the Sakaguchi-Kuramoto model with natural frequency following a bimodal distr...
Synchronization of coupled simple harmonic oscillators is a well-studied problem in advanced undergr...
We consider the inertial Kuramoto model of N globally coupled oscillators characterized by both thei...
The Kuramoto model is a paradigmatic tool for studying the dynamics of collective behavior in large ...
We investigate the transition to synchronization in the Kuramoto model with bimodal distributions of...
The Kuramoto model of a network of coupled phase oscillators exhibits a first-order phase transition...
The Kuramoto model of a network of coupled phase oscillators exhibits a first-order phase transition...
We discuss the influence of small phase lags on the synchronization transitions in the Kuramoto mode...
We discuss the influence of small phase lags on the synchronization transitions in the Kuramoto mode...
We discuss the influence of small phase lags on the synchronization transitions in the Kuramoto mode...
We investigate the transition to synchrony in a system of phase oscillators that are globally couple...
We investigate the transition to synchrony in a system of phase oscillators that are globally couple...
The phenomenon of spontaneous synchronization, particularly within the framework of the Kuramoto mod...
Synchronization phenomena in large populations of interacting elements are the subject of intense re...
We analyze the synchronization dynamics of the thermodynamically large systems of globally coupled p...
In this work, we study the Sakaguchi-Kuramoto model with natural frequency following a bimodal distr...
Synchronization of coupled simple harmonic oscillators is a well-studied problem in advanced undergr...
We consider the inertial Kuramoto model of N globally coupled oscillators characterized by both thei...
The Kuramoto model is a paradigmatic tool for studying the dynamics of collective behavior in large ...