接近非平衡态:从反常扩散到非高斯扩散。

IF 3.3 2区 数学 Q1 MATHEMATICS, APPLIED Chaos Pub Date : 2025-02-01 DOI:10.1063/5.0243203
I G Marchenko, I I Marchenko, J Łuczka, J Spiechowicz
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引用次数: 0

摘要

实验技术的最新进展,如单粒子跟踪,使人们能够分析非平衡性质和平衡方法。有一些例子表明,在有限时间尺度上发生的过程与它们的平衡对应过程明显不同。在这项工作中,我们分析了一个类似的非平衡问题。我们考虑了一个由布朗粒子组成的非平衡系统的原型模型,该系统驻留在空间周期势中,并由外部时间周期力驱动。我们关注扩散过程并及时监测其发展。在给出的参数域中,测量粒子位移分布的高斯性的多余峰度以非单调的方式发展:首先是负的(平峰形式),然后变为正的(细峰形式),然后衰减到零(中峰形式)。尽管存在后一种情况,但在长时间限制下的扩散是布朗的,而不是高斯的。此外,我们还发现了粒子位移分布的非高斯性与有限时间尺度下出现的瞬态异常扩散行为之间的相关性。
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Approach to nonequilibrium: From anomalous to Brownian diffusion via non-Gaussianity.

Recent progress in experimental techniques, such as single particle tracking, allows one to analyze both nonequilibrium properties and an approach to equilibrium. There are examples showing that processes occurring at finite timescales are distinctly different than their equilibrium counterparts. In this work, we analyze a similar problem of an approach to nonequilibrium. We consider an archetypal model of a nonequilibrium system consisting of a Brownian particle dwelling in a spatially periodic potential and driven by an external time-periodic force. We focus on a diffusion process and monitor its development in time. In the presented parameter regime, the excess kurtosis measuring the Gaussianity of the particle displacement distribution evolves in a non-monotonic way: first, it is negative (platykurtic form), next, it becomes positive (leptokurtic form), and then decays to zero (mesokurtic form). Despite the latter fact, diffusion in the long time limit is Brownian, yet non-Gaussian. Moreover, we discover a correlation between non-Gaussianity of the particle displacement distribution and transient anomalous diffusion behavior emerging for finite timescales.

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来源期刊
Chaos
Chaos 物理-物理:数学物理
CiteScore
5.20
自引率
13.80%
发文量
448
审稿时长
2.3 months
期刊介绍: Chaos: An Interdisciplinary Journal of Nonlinear Science is a peer-reviewed journal devoted to increasing the understanding of nonlinear phenomena and describing the manifestations in a manner comprehensible to researchers from a broad spectrum of disciplines.
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