确定场地渗流问题的非欧几里得临界下维度

IF 1.6 4区 物理与天体物理 Q3 PHYSICS, CONDENSED MATTER
P. M. Centres, F. Nieto
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引用次数: 0

摘要

摘要 通过全面的数值模拟研究了西尔品斯基地毯上的点渗流。我们利用有限尺寸缩放理论,在计算资源的限制下,确定了临界指数和渗流阈值。此外,我们还采用了埃利奥特等人开发的一种方法(Phys Rev C 6:3185, 1994; Phys Rev C 55:1319, 1997),通过消除处理大网格的必要性来简化这一过程。这种方法有助于提取临界量,这些临界量是给定结构中单代过渡的特征。通过实施这一程序,我们提高了分析西尔平斯基地毯上渗滤现象的效率和准确性。得到的渗滤阈值与分形维度的函数关系图,以确定位点渗滤问题的下临界维度,计算结果为 \(d_c^L=1.52\)。此外,还显示并讨论了临界指数作为分形维度函数的行为。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Determination of the non-Euclidean lower critical dimension for the site percolation problem

Determination of the non-Euclidean lower critical dimension for the site percolation problem

The investigation of site percolation on Sierpinski carpets is carried out through comprehensive numerical simulations. We utilize finite- size scaling theory, staying within the constraints of our computational resources, to determine critical exponents and percolation thresholds. Moreover, we employ an approach developed by Elliot et al. (Phys Rev C 6:3185, 1994; Phys Rev C 55:1319, 1997), which streamlines the process by eliminating the necessity of dealing with large lattices. This method facilitates the extraction of critical quantities that characterize the transition from a single generation within a given structure. By implementing this procedure, we enhance efficiency and accuracy in analyzing the percolation phenomenon on Sierpinski carpets. The obtained values of the percolation thresholds are plotted as a function of the fractal dimensions in order to determine the lower critical dimension of the site percolation problem which is calculated to be \(d_c^L=1.52\). In addition, the behavior of the critical exponents as a function of the fractal dimension is also shown and discussed.

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来源期刊
The European Physical Journal B
The European Physical Journal B 物理-物理:凝聚态物理
CiteScore
2.80
自引率
6.20%
发文量
184
审稿时长
5.1 months
期刊介绍: Solid State and Materials; Mesoscopic and Nanoscale Systems; Computational Methods; Statistical and Nonlinear Physics
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