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Carleman-Fourier linearization of nonlinear real dynamical systems with quasi-periodic fields

Published 3 Mar 2025 in math.DS, cs.SY, and eess.SY | (2503.01498v1)

Abstract: This work presents Carleman-Fourier linearization for analyzing nonlinear real dynamical systems with quasi-periodic vector fields characterized by multiple fundamental frequencies. Using Fourier basis functions, this novel framework transforms such dynamical systems into equivalent infinite-dimensional linear dynamical systems. In this work, we establish the exponential convergence of the primary block in the finite-section approximation of this linearized system to the state vector of the original nonlinear system. To showcase the efficacy of our approach, we apply it to the Kuramoto model, a prominent model for coupled oscillators. The results demonstrate promising accuracy in approximating the original system's behavior.

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