Criticality and Universality of Generalized Kuramoto Model

Abstract

We explore synchronization transitions in even-D-dimensional generalized Kuramoto oscillators on both complete graphs and d-dimensional lattices. In the globally coupled system, analytical expansions of the self-consistency equations, incorporating finite-size corrections, reveal universal critical exponents β = 1/2 and = 5/2 for all even D, indicating an unconventional upper critical dimension du = 5. Extensive numerical simulations across multiple D confirm these theoretical predictions. For locally coupled systems, we develop a framework based on spin-wave theory and fluctuation-resolved functional network diagnostics, which captures criticality in entrainment transition. A modified Edwards-Anderson order parameter further validates the predicted exponents. This combined theoretical and numerical study uncovers a family of universality classes characterized by D-independent but d-dependent criticality, offering a unified perspective on symmetry and dimensionality in nonequilibrium synchronization phenomena.