Avoiding Small Denominator Problems by Means of the Homotopy Analysis Method

IF 1.5 4区 工程技术 Q2 MATHEMATICS, APPLIED Advances in Applied Mathematics and Mechanics Pub Date : 2022-08-03 DOI:10.4208/aamm.OA-2022-0260
S. Liao
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引用次数: 2

Abstract

The so-called ``small denominator problem'' was a fundamental problem of dynamics, as pointed out by Poincar\'{e}. Small denominators appear most commonly in perturbative theory. The Duffing equation is the simplest example of a non-integrable system exhibiting all problems due to small denominators. In this paper, using the forced Duffing equation as an example, we illustrate that the famous ``small denominator problems'' never appear if a non-perturbative approach based on the homotopy analysis method (HAM), namely ``the method of directly defining inverse mapping'' (MDDiM), is used. The HAM-based MDDiM provides us great freedom to directly define the inverse operator of an undetermined linear operator so that all small denominators can be completely avoided and besides the convergent series of multiple limit-cycles of the forced Duffing equation with high nonlinearity are successfully obtained. So, from the viewpoint of the HAM, the famous ``small denominator problems'' are only artifacts of perturbation methods. Therefore, completely abandoning perturbation methods but using the HAM-based MDDiM, one would be never troubled by ``small denominators''. The HAM-based MDDiM has general meanings in mathematics and thus can be used to attack many open problems related to the so-called ``small denominators''.
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用同伦分析法避免小分母问题
所谓的“小分母问题”是动力学的一个基本问题,正如庞加莱所指出的那样。小分母在微扰理论中最常见。Duffing方程是非可积系统中最简单的例子,它展示了由于小分母而引起的所有问题。本文以强迫Duffing方程为例,说明了如果采用基于同伦分析方法(HAM)的非摄动方法,即直接定义逆映射方法(MDDiM),则不会出现著名的“小分母问题”。基于hamm的MDDiM为直接定义一个未定线性算子的逆算子提供了很大的自由度,从而完全避免了所有的小分母,并成功地获得了具有高非线性的强迫Duffing方程的多个极限环的收敛级数。因此,从HAM的观点来看,著名的“小分母问题”只是摄动方法的产物。因此,完全放弃摄动方法而使用基于ham的MDDiM,就不会被“小分母”所困扰。基于ham的MDDiM在数学中具有一般意义,因此可用于解决与所谓的“小分母”相关的许多开放问题。
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来源期刊
Advances in Applied Mathematics and Mechanics
Advances in Applied Mathematics and Mechanics MATHEMATICS, APPLIED-MECHANICS
CiteScore
2.60
自引率
7.10%
发文量
65
审稿时长
6 months
期刊介绍: Advances in Applied Mathematics and Mechanics (AAMM) provides a fast communication platform among researchers using mathematics as a tool for solving problems in mechanics and engineering, with particular emphasis in the integration of theory and applications. To cover as wide audiences as possible, abstract or axiomatic mathematics is not encouraged. Innovative numerical analysis, numerical methods, and interdisciplinary applications are particularly welcome.
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