Resonance and Periodic Solutions for Harmonic Oscillators with General Forcing

arXiv - MATH - Classical Analysis and ODEs Pub Date : 2024-07-24 DOI:arxiv-2407.17144

Isaac Benson, Justin T. Webster

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Abstract

We discuss the notion of resonance, as well as the existence and uniqueness of periodic solutions for a forced simple harmonic oscillator. While this topic is elementary, and well-studied for sinusoidal forcing, this does not seem to be the case when the forcing function is general (perhaps discontinuous). Clear statements of theorems and proofs do not readily appear in standard textbooks or online. For that reason, we provide a characterization of resonant solutions, written in terms of the relationship between the forcing and natural frequencies, as well as a condition on a particular Fourier mode. While our discussions involve some notions from $L^2$-spaces, our proofs are elementary, using this the variation of parameters formula; the main theorem and its proof should be readable by students who have completed a differential equations course and have some experience with analysis. We provide several examples, and give various constructions of resonant solutions. Additionally, we connect our discussion to notions of resonance in systems of partial differential equations, including fluid-structure interactions and partially damped systems.

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带一般强迫的谐振子的共振和周期解法

我们讨论了共振的概念，以及受迫简谐振荡器周期解的存在性和唯一性。虽然这一主题是基本的，而且对正弦强迫进行了深入研究，但当强迫函数是一般的（也许是不连续的）时，情况似乎就不是这样了。在标准教科书或网上，很难找到明确的定理和证明。因此，我们提供了共振解的特征描述，用强迫频率和自然频率之间的关系以及特定傅立叶模式的条件来表述。虽然我们的讨论涉及 $L^2$ 空间的一些概念，但我们的证明是基本的，使用的是参数变化公式；完成微分方程课程并具有一定分析经验的学生应该可以读懂主定理及其证明。我们提供了几个例子，并给出了共振解的各种构造。此外，我们还将讨论与偏微分方程系统中的共振概念联系起来，包括流体-结构相互作用和部分阻尼系统。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - MATH - Classical Analysis and ODEs

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