时间棘轮的多重时间分析

IF 1.8 4区 物理与天体物理 Q4 CHEMISTRY, PHYSICAL
Aref Hashemi, Edward T. Gilman, Aditya S. Khair
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引用次数: 0

摘要

摘要 我们建立了一个双时态扰动分析,以提供关于在一个粒子在流体槽中运动的示例系统中存在时态棘轮的定量见解,该系统对槽的外部振动做出响应。我们考虑角频率为\(\omega \)和\(\alpha \omega \)的双模振动,其中\(\alpha \)是有理数。如果 \(\alpha \)是奇数和偶数整数之比(例如 \(\tfrac{2}{1},\,\tfrac{3}{2},\,\tfrac{4}{3})),系统就会产生一个净响应:这里是一个非零的时间平均粒子速度。我们的一阶扰动求解预测了 \(α =2\) 的时间棘轮的存在。此外,我们还证明,对于一个简化模型,\(\alpha =\tfrac{3}{2}\) 和\(\tfrac{4}{3}\)的时间棘轮效应出现在三阶扰动解中。更重要的是,我们为这些 \(α \) 值的诱导净速度的大小和方向找到了闭式公式。在更广的范围内,我们的方法为研究物理系统中时间棘轮的复杂性质提供了一种新的数学方法。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

A multiple-timing analysis of temporal ratcheting

A multiple-timing analysis of temporal ratcheting

We develop a two-timing perturbation analysis to provide quantitative insights on the existence of temporal ratchets in an exemplary system of a particle moving in a tank of fluid in response to an external vibration of the tank. We consider two-mode vibrations with angular frequencies \(\omega \) and \(\alpha \omega \), where \(\alpha \) is a rational number. If \(\alpha \) is a ratio of odd and even integers (e.g., \(\tfrac{2}{1},\,\tfrac{3}{2},\,\tfrac{4}{3}\)), the system yields a net response: here, a nonzero time-average particle velocity. Our first-order perturbation solution predicts the existence of temporal ratchets for \(\alpha =2\). Furthermore, we demonstrate, for a reduced model, that the temporal ratcheting effect for \(\alpha =\tfrac{3}{2}\) and \(\tfrac{4}{3}\) appears at the third-order perturbation solution. More importantly, we find closed-form formulas for the magnitude and direction of the induced net velocities for these \(\alpha \) values. On a broader scale, our methodology offers a new mathematical approach to study the complicated nature of temporal ratchets in physical systems.

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来源期刊
The European Physical Journal E
The European Physical Journal E CHEMISTRY, PHYSICAL-MATERIALS SCIENCE, MULTIDISCIPLINARY
CiteScore
2.60
自引率
5.60%
发文量
92
审稿时长
3 months
期刊介绍: EPJ E publishes papers describing advances in the understanding of physical aspects of Soft, Liquid and Living Systems. Soft matter is a generic term for a large group of condensed, often heterogeneous systems -- often also called complex fluids -- that display a large response to weak external perturbations and that possess properties governed by slow internal dynamics. Flowing matter refers to all systems that can actually flow, from simple to multiphase liquids, from foams to granular matter. Living matter concerns the new physics that emerges from novel insights into the properties and behaviours of living systems. Furthermore, it aims at developing new concepts and quantitative approaches for the study of biological phenomena. Approaches from soft matter physics and statistical physics play a key role in this research. The journal includes reports of experimental, computational and theoretical studies and appeals to the broad interdisciplinary communities including physics, chemistry, biology, mathematics and materials science.
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