Comparison of coupled nonlinear oscillator models for the transient response of power generating stations connected to low inertia systems
Marios Zarifakis, Declan J. Byrne, William T. Coffey, Yuri P., Kalmykov, Serguey V. Titov, and Stephen J. Carrig

TL;DR
This paper compares the effectiveness of Kuramoto and cage models in describing the transient response of power systems with varying inertia, highlighting the cage model's suitability for low inertia grids.
Contribution
It introduces a unified framework to compare coupled oscillator models and demonstrates the cage model's advantages for low inertia power systems.
Findings
Cage model better captures low inertia system dynamics.
Synchronization times vary significantly with inertia and damping.
Power output and frequencies show damped oscillations after disturbances.
Abstract
Coupled nonlinear oscillators, e.g., Kuramoto models, are commonly used to analyze electrical power systems. The cage model from statistical mechanics has also been used to describe the dynamics of synchronously connected generation stations. Whereas the Kuramoto model is good for describing high inertia grid systems, the cage one allows both high and low inertia grids to be modelled. This is illustrated by comparing both the synchronization time and relaxation towards synchronization of each model by treating their equations of motion in a common framework rooted in the dynamics of many coupled phase oscillators. A solution of these equations via matrix continued fractions is implemented rendering the characteristic relaxation times of a grid-generator system over a wide range of inertia and damping. Following an abrupt change in the dynamical system, the power output and both…
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