Kuramoto meets Koopman: Constants of motion, symmetries, and network motifs
Abstract
The partial integrability of the Kuramoto model is often thought to be restricted to identically connected oscillators or groups thereof. Yet, the exact connectivity prerequisites for having constants of motion on more general graphs have remained elusive. Using spectral properties of the Koopman generator, we derive necessary and sufficient conditions for the existence of distinct constants of motion in the Kuramoto model with heterogeneous phase lags on any weighted, directed, signed graph. This reveals a broad class of network motifs that support conserved quantities. Furthermore, we identify Lie symmetries that generate new constants of motion. Our results provide a rigorous theoretical application of Koopman's framework to nonlinear dynamics on complex networks.