Reduction and Reconstruction of the Oscillator in 1:1:2 Resonance plus an Axially Symmetric Polynomial Perturbation

IF 1.7 4区 数学 Q2 MATHEMATICS, APPLIED
Yocelyn Pérez Rothen, Claudio Vidal
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Abstract

SIAM Journal on Applied Dynamical Systems, Volume 23, Issue 3, Page 2489-2532, September 2024.
Abstract.We consider a family of perturbed Hamiltonian systems with Hamiltonian [math] in 1:1:2 resonance, where [math] is a polynomial which is axially symmetric with respect to the [math]-axis. Here, [math] is a homogeneous polynomial of degree [math], and we note that our analysis is carried out considering the polynomials [math] and [math]. We initially perform a Lie–Deprit normalization (truncation of the higher-order terms), and a singular reduction by the oscillator symmetry is done. Considering the averaging method for Hamiltonian systems, the existence and an approximation of two families of periodic solutions are proved together with their linear stability. A third family of periodic solutions is found by using the Lyapunov center theorem. In addition, the existence of KAM 3-tori is obtained by enclosing the stable periodic solutions. After that, since the Hamiltonian is axially symmetric, we carry out another reduction induced by this exact symmetry. Studying its Poisson vector field on the reduced space by the exact symmetry, we show the existence of two equilibrium points. We reconstruct these points as two families of periodic solutions of the complete Hamiltonian system together with their linear stability. Next, we make a second singular reduction using the axial symmetry. A geometrical study of the twice-reduced space is done to characterize the singularities. Precisely, we study the critical points (relative equilibria) on the twice-reduced space together with the stability, and parametric bifurcations are determined. The equilibria occurring in the twice-reduced space are reconstructed as 3-tori filled by quasi-periodic solutions of the full system. Our analysis permits us to determine the main representative parameters of the cubic ([math]) and quartic ([math]) terms to get our results. Important differences with the case of resonance 1:1:1 are detected.
1:1:2 共振加轴对称多项式扰动振荡器的还原与重构
SIAM 应用动力系统期刊》,第 23 卷第 3 期,第 2489-2532 页,2024 年 9 月。 摘要.我们考虑了一族具有 1:1:2 共振的哈密顿[math]的扰动哈密顿系统,其中[math]是关于[math]轴的轴对称多项式。这里,[math]是阶数为[math]的同次多项式,我们注意到,我们的分析是在考虑多项式[math]和[math]的情况下进行的。我们首先进行 Lie-Deprit 归一化(截断高阶项),然后根据振荡器对称性进行奇异性还原。考虑到哈密顿系统的平均法,我们证明了两个周期解族的存在和近似,以及它们的线性稳定性。利用 Lyapunov 中心定理找到了第三个周期解系列。此外,通过包围稳定的周期解,还得到了 KAM 3-Tori 的存在性。之后,由于哈密顿是轴对称的,我们对这一精确对称性进行了另一种还原。通过研究精确对称性缩小空间上的泊松矢量场,我们证明了两个平衡点的存在。我们将这些点重构为完整哈密顿系统的两个周期解系列及其线性稳定性。接下来,我们利用轴对称进行第二次奇异还原。我们对两次还原的空间进行了几何研究,以确定奇点的特征。确切地说,我们研究了两次还原空间上的临界点(相对平衡点)及其稳定性,并确定了参数分岔。两次还原空间中出现的均衡点被重构为由完整系统的准周期解填充的 3 道。通过分析,我们可以确定三次项([math])和四次项([math])的主要代表参数,从而得出结果。我们发现了与共振 1:1:1 情况下的重要差异。
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来源期刊
SIAM Journal on Applied Dynamical Systems
SIAM Journal on Applied Dynamical Systems 物理-物理:数学物理
CiteScore
3.60
自引率
4.80%
发文量
74
审稿时长
6 months
期刊介绍: SIAM Journal on Applied Dynamical Systems (SIADS) publishes research articles on the mathematical analysis and modeling of dynamical systems and its application to the physical, engineering, life, and social sciences. SIADS is published in electronic format only.
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