Bifurcations and global stability of synchronized stationary states in the Kuramoto model for oscillator populations
Abstract
The existence of a bistable behavior between (partially) synchronized stationary states, occurring in large populations of nonlinearly coupled random oscillators, was studied. This was done in the framework of the so-called Kuramot model. A central peak in the natural frequency distribution allowed for the existence of bistability between stationary solutions.
Type
Publication
Physical Review E - Statistical, Nonlinear, and Soft Matter Physics
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