Analysis of nonlinear LC circuit by symplectic conservative perturbation method
ISSN: 0332-1649
Article publication date: 7 April 2022
Issue publication date: 26 August 2022
Abstract
Purpose
This paper aims to provide a symplectic conservation numerical analysis method for the study of nonlinear LC circuit.
Design/methodology/approach
The flux linkage control type nonlinear inductance model is adopted, and the LC circuit can be converted into the Hamiltonian system by introducing the electric charge as the state variable of the flux linkage. The nonlinear Hamiltonian matrix equation can be solved by perturbation method, which can be written as the sum of linear and nonlinear terms. Firstly, the linear part can be solved exactly. On this basis, the nonlinear part is analyzed by the canonical transformation. Then, the coefficient matrix of the obtained equation is still a Hamiltonian matrix, so symplectic conservation is achieved.
Findings
Numerical results reveal that the method proposed has strong stability, high precision and efficiency, and it has great advantages in long-term simulations.
Originality/value
This method provides a novel and effective way in studying the nonlinear LC circuit.
Keywords
Acknowledgements
This work was supported by the National Key Research and Development Program of China (2018YFB0703500) and the Natural Science Foundation of Beijing (3202001).
Citation
Yang, H., Wang, Y., Zhang, M. and Long, L. (2022), "Analysis of nonlinear
Publisher
:Emerald Publishing Limited
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