A center manifold reduction of the Kuramoto-Daido model with a phase-lag

Abstract

A bifurcation from the incoherent state to the partially synchronized state of the Kuramoto-Daido model with the coupling function f(θ ) = (θ +α 1) + h 2(θ +α 2) is investigated based on the generalized spectral theory and the center manifold reduction. The dynamical system of the order parameter on a center manifold is derived under the assumption that there exists a center manifold on the dual space of a certain test function space. It is shown that the incoherent state loses the stability at a critical coupling strength K=Kc, and a stable rotating partially synchronized state appears for K>Kc. The velocity of the rotating state is different from the average of natural frequencies of oscillators when α 1 ≠ 0.