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Main Authors: Xing, Jiamin, Li, Yong, Ji, Shuguan
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2503.02540
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author Xing, Jiamin
Li, Yong
Ji, Shuguan
author_facet Xing, Jiamin
Li, Yong
Ji, Shuguan
contents In this paper, we present an averaging method for obtaining quasi-periodic response solutions in perturbed, real analytic, quasi-periodic systems with Diophantine frequency vectors. Under the assumptions that the averaged system possesses a non-degenerate equilibrium and that the eigenvalues of its linearized matrix are pairwise distinct, we show that the original system admits a quasi-periodic response solution for parameters in a Cantorian set. The proof relies on KAM techniques. It is worth mentioning that our results do not require the equilibrium to be hyperbolic, meaning that the eigenvalues of the linearized matrix of the averaged system may be purely imaginary. Furthermore, the proposed averaging method is applicable to second-order systems, and a higher-order averaging framework is also established.
format Preprint
id arxiv_https___arxiv_org_abs_2503_02540
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Averaging method for quasi-periodic response solutions
Xing, Jiamin
Li, Yong
Ji, Shuguan
Dynamical Systems
In this paper, we present an averaging method for obtaining quasi-periodic response solutions in perturbed, real analytic, quasi-periodic systems with Diophantine frequency vectors. Under the assumptions that the averaged system possesses a non-degenerate equilibrium and that the eigenvalues of its linearized matrix are pairwise distinct, we show that the original system admits a quasi-periodic response solution for parameters in a Cantorian set. The proof relies on KAM techniques. It is worth mentioning that our results do not require the equilibrium to be hyperbolic, meaning that the eigenvalues of the linearized matrix of the averaged system may be purely imaginary. Furthermore, the proposed averaging method is applicable to second-order systems, and a higher-order averaging framework is also established.
title Averaging method for quasi-periodic response solutions
topic Dynamical Systems
url https://arxiv.org/abs/2503.02540