一类拉格朗日机械系统的重整化群方法

IF 0.5 Q4 ENGINEERING, MULTIDISCIPLINARY Journal of the Serbian Society for Computational Mechanics Pub Date : 2022-12-01 DOI:10.24874/jsscm.2022.16.02.07
Zheng Mingliang
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引用次数: 0

摘要

考虑到小参数摄动项在机械系统中的重要作用,建立了拉格朗日系统的摄动动力微分方程。将正规重整化群法求解常微分方程的基本思想和方法移植到一类拉格朗日力学系统中,得到了欧拉-拉格朗日方程的重整化群方程,给出了单自由度拉格朗日系统的一阶一致有效渐近近似解。通过两个算例详细说明了重整化群方法的计算步骤,并验证了该方法的正确性。本文的创新发现是,对于可积的拉格朗日系统,其重整化群方程也是可积的,并且满足Hamilton系统的结构。
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RENORMALIZATION GROUP METHOD FOR A CLASS OF LAGRANGE MECHANICAL SYSTEMS
Considering the important role of small parameter perturbation term in mechanical systems, the perturbed dynamic differential equations of Lagrange systems are established. The basic idea and method of solving ordinary differential equations by normal renormalization group method are transplanted into a kind of Lagrange mechanical systems, the renormalization group equations of Euler-Lagrange equations are obtained, and the first-order uniformly valid asymptotic approximate solution of Lagrange systems with a single-degree-of-freedom is given. Two examples are used to show the calculation steps of renormalization group method in detail as well as to verify the correctness of the method. The innovative finding of this paper is that for integrable Lagrange systems, its renormalization group equations are also integrable and satisfy the Hamilton system's structure.
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