RESPONSE SOLUTIONS OF 2-DIMENSIONAL ELLIPTIC DEGENERATE QUASI-PERIODIC SYSTEMS WITH SMALL PARAMETERS

Song Ni, 2024 Volume 2024, pp. 19

Authors

  • Song Ni School of Mathematics, Southeast University, Nanjing, China

DOI:

https://doi.org/10.20319/icstr.2024.19

Keywords:

Quasi-Periodic Systems, KAM-Iteration, Degenerate Equilibrium Point, Response Solution

Abstract

This paper concerns quasi-periodic perturbations with parameters of 2-dimensional degenerate systems. If the equilibrium point of the unperturbed system is elliptic-type degenerate. Assume that the perturbation is real analytic quasi-periodic with diophantine frequency. Without imposing any assumption on the perturbation, we can use a path of equilibrium points to tackle with the Melnikov non-resonance condition, then by the Leray-Schauder Continuation Theorem and the Kolmogorov-Arnold-Moser technique, it is proved that the equation has a small response solution for many sufficiently small parameters.

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Published

2024-03-15

How to Cite

Ni, S. (2024). RESPONSE SOLUTIONS OF 2-DIMENSIONAL ELLIPTIC DEGENERATE QUASI-PERIODIC SYSTEMS WITH SMALL PARAMETERS: Song Ni, 2024 Volume 2024, pp. 19. MATTER: International Journal of Science and Technology, 19. https://doi.org/10.20319/icstr.2024.19

Issue

2024: Proceedings of Scientific and Technical Research Association (STRA)

Section

Articles

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