Pinning-depinning transitions in two classes of discrete elastic-string models in (2+1)-dimensions

IF 2.2 3区 物理与天体物理 Q2 MECHANICS Journal of Statistical Mechanics: Theory and Experiment Pub Date : 2024-05-28 DOI:10.1088/1742-5468/ad4af9
Yongxin Wu and Hui Xia
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Abstract

The pinning-depinning phase transitions of interfaces for two classes of discrete elastic-string models are investigated numerically. In the (1+1)-dimensions, we revisit these two elastic-string models with slight modification to the growth rule, and compare the estimated values with the previous numerical and experimental results. For the (2+1)-dimensional case, we perform extensive simulations on pinning-depinning transitions in these discrete models with quenched disorder. For full comparisons in the physically relevant spatial dimensions, we also perform numerically two distinct universality classes, including the quenched Edwards–Wilkinson, and the quenched Kardar–Parisi–Zhang equations with and without external driving forces. The critical exponents of these systems in the presence of quenched disorder are numerically estimated. Our results show that the critical exponents satisfy scaling relations well, and these two discrete elastic-string models do not fall into the existing universality classes. In order to visually comparisons of these discrete systems with quenched disorder in the (2+1)-dimensional cases, we present surface morphologies with various external driving forces during the saturated time regimes. The relationships between surface morphologies, scaling exponents and correlation length are also revealed.
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(2+1)维两类离散弹性弦模型中的针化-去针化转变
我们用数值方法研究了两类离散弹性弦模型的界面针化-去针化相变。在(1+1)维情况下,我们对这两种弹性弦模型的生长规则稍作修改后重新进行了研究,并将估计值与之前的数值和实验结果进行了比较。对于(2+1)维情况,我们对这些具有淬火无序性的离散模型中的针销-脱销转变进行了大量模拟。为了在物理相关的空间维度上进行全面比较,我们还对两个不同的普遍性类别进行了数值模拟,包括淬火爱德华-威尔金森方程和淬火卡达尔-帕里西-张方程(有无外部驱动力)。我们对这些系统在淬火无序情况下的临界指数进行了数值估算。我们的结果表明,临界指数很好地满足了比例关系,而且这两个离散弹性弦模型不属于现有的普遍性类别。为了直观地比较这些离散系统在(2+1)维情况下的淬火无序性,我们展示了饱和时间内各种外部驱动力作用下的表面形态。我们还揭示了表面形态、缩放指数和相关长度之间的关系。
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来源期刊
CiteScore
4.50
自引率
12.50%
发文量
210
审稿时长
1.0 months
期刊介绍: JSTAT is targeted to a broad community interested in different aspects of statistical physics, which are roughly defined by the fields represented in the conferences called ''Statistical Physics''. Submissions from experimentalists working on all the topics which have some ''connection to statistical physics are also strongly encouraged. The journal covers different topics which correspond to the following keyword sections. 1. Quantum statistical physics, condensed matter, integrable systems Scientific Directors: Eduardo Fradkin and Giuseppe Mussardo 2. Classical statistical mechanics, equilibrium and non-equilibrium Scientific Directors: David Mukamel, Matteo Marsili and Giuseppe Mussardo 3. Disordered systems, classical and quantum Scientific Directors: Eduardo Fradkin and Riccardo Zecchina 4. Interdisciplinary statistical mechanics Scientific Directors: Matteo Marsili and Riccardo Zecchina 5. Biological modelling and information Scientific Directors: Matteo Marsili, William Bialek and Riccardo Zecchina
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