Bifurcations of coupled nonlinear oscillators with similar kinematics
DOI:
https://doi.org/10.15407/dopovidi2020.01.033Keywords:
bifurcation, nonlinear system, principle of skew symmetryAbstract
The application of the principle of skew symmetry for nonlinear systems that represent a bunch of nonlinear Van der Pol oscillators is analyzed. A bunch of oscillators can (depending on the parameters) form systems of coupled regular limiting cycles and coupled attractors with chaotic or conditionally periodic winding of the trajectory. At a slight change in the parameters of oscillators, the scale of two limiting cycles changes. A strong change in the parameters and the coupling coefficient leads to the appearance of limiting cycles with chaotic winding of the trajectory. When considering three connected limiting cycles, one can reduce them to two ones with a periodic winding and one limiting cycle with a conditionally periodic winding. To clarify the nature of the winding of the trajectories, a topological analysis of the trajectory should be done. In this case, the equations in variations are constructed, and the characteristic indicators of solutions are found.
Downloads
References
Nikitina, N. V. (2018). Bifurcations in Reference Models of Multidimensional Systems. Int.Appl.Mech., 54, No. 6, pp. 702709. Doi: https://doi.org/10.1007/s10778-018-0925-8
Nemytskii, V. V. & Stepanov, V. V. (1960). Qualitative Theory of Differential Equation. Princeton: Princeton Univ. Press.
Nikitina, N. V. (2012). Nonlinear systems with complex and chaotic behavior of trajectories. Kyiv: Phenix (in Russian).
Mishchenko, E. F., Kolesov, Yu. S., Kolesov, F. Yu. & Rozov, N. Kh. (1995). Periodic movements and bifurca tioln in a singular disturbet systems. Moscow: Fizmatg³z (in Russian).
Nikitina, N. V. (2017). The principle of symmetry in treedimensional systems. Dopov. Nac. acad. nauk Ukr., No. 7, pp. 2129 (in Russian). Doi: https://doi.org/10.15407/dopovidi2017.07.021
Downloads
Published
How to Cite
Issue
Section
License
Copyright (c) 2023 Reports of the National Academy of Sciences of Ukraine
This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.