Anomalous Solute Transport Using Adsorption Effects and the Degradation of Solute

IF 1.9 Q2 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS

Computation Pub Date : 2023-11-16 DOI:10.3390/computation11110229

B. K. Khuzhayorov, K. K. Viswanathan, F. B. Kholliev, A. Usmonov

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引用次数: 0

Abstract

In this work, anomalous solute transport using adsorption effects and the decomposition of solute was studied. During the filtration of inhomogeneous liquids, a number of new phenomena arise, and this is very important for understanding the mechanisms of the filtration process. Recently, issues of mathematical modeling of substance transfer processes have been intensively discussed. Modeling approaches are based on the law of matter balance in a certain control volume using additional phenomenological relationships. The process of anomalous solute transport in a porous medium was modeled by differential equations with a fractional derivative. A new mobile—immobile model is proposed to describe anomalous solute transport with a scale-dependent dispersion in inhomogeneous porous media. The profiles of changes in the concentrations of suspended particles in the macropore and micropore were determined. The influence of the order of the derivative with respect to the coordinate and time, i.e., the fractal dimension of the medium, was estimated based on the characteristics of the solute transport in both zones. The hydrodynamic dispersion was set through various relations: constant, linear, and exponential. Based on the numerical results, the concentration fields were determined for different values of the initial data and different relations of hydrodynamic dispersion.

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利用吸附效应和溶质降解的异常溶质迁移

在这项工作中，利用吸附效应和溶质分解对异常溶质传输进行了研究。在非均质液体的过滤过程中，会出现许多新现象，这对于理解过滤过程的机理非常重要。最近，人们对物质转移过程的数学建模问题进行了深入讨论。建模方法以一定控制体积内的物质平衡定律为基础，并使用附加的现象学关系。多孔介质中的反常溶质传输过程是通过带有分数导数的微分方程建模的。提出了一种新的移动-非移动模型，用于描述非均质多孔介质中随尺度分散的溶质异常迁移。确定了大孔和小孔中悬浮颗粒浓度的变化曲线。根据两个区域的溶质输运特征，估算了与坐标和时间有关的导数阶次（即介质的分形维度）的影响。流体动力分散是通过各种关系设定的：常数、线性和指数。根据数值结果，确定了不同初始数据值和不同水动力分散关系下的浓度场。

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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来源期刊

Computation Mathematics-Applied Mathematics

CiteScore

3.50

自引率

4.50%

发文量

201

审稿时长

8 weeks

期刊介绍： Computation a journal of computational science and engineering. Topics: computational biology, including, but not limited to: bioinformatics mathematical modeling, simulation and prediction of nucleic acid (DNA/RNA) and protein sequences, structure and functions mathematical modeling of pathways and genetic interactions neuroscience computation including neural modeling, brain theory and neural networks computational chemistry, including, but not limited to: new theories and methodology including their applications in molecular dynamics computation of electronic structure density functional theory designing and characterization of materials with computation method computation in engineering, including, but not limited to: new theories, methodology and the application of computational fluid dynamics (CFD) optimisation techniques and/or application of optimisation to multidisciplinary systems system identification and reduced order modelling of engineering systems parallel algorithms and high performance computing in engineering.