Linear stability of the incoherent solution and the transition formula for the Kuramoto-Daido model

Abstract

The Kuramoto-Daido model, which describes synchronization phenomena, is a system of ordinary differential equations on N-torus defined as coupled harmonic oscillators, whose natural frequencies are drawn from some distribution function. In this paper, the continuous model for the Kuramoto-Daido model is introduced and the linear stability of its trivial solution (incoherent solution) is investigated. Kuramoto's transition point Kc, at which the incoherent solution changes the stability, is derived for an arbitrary distribution function for natural frequencies. It is proved that if the coupling strength K is smaller than Kc, the incoherent solution is asymptotically stable, while if K is larger than Kc, it is unstable.