均质有界剖面中垂直渗透的解析解

IF 4 2区 农林科学 Q2 SOIL SCIENCE
I. Argyrokastritis, K. Kalimeris, L. Mindrinos
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引用次数: 0

摘要

在本研究中,我们推导出一种分析方法,用于解决一维均质有界剖面内的垂直渗透问题。首先,我们考虑理查兹方程和德里赫特边界条件。我们假设扩散率恒定,且电导率与含水量之间存在线性关系,从而得出扩散类型的线性偏微分方程。为了求解有限区间内的简化初始边界值问题,我们采用了统一变换,即通常所说的 Fokas 方法。通过这种方法,我们获得了解的积分表示,可以直接有效地进行数值计算,从而产生一个收敛方案。我们研究了各种情况,并将我们的解决方案与众所周知的近似解决方案进行了比较。这项工作可以看作是为更困难、更复杂的异质层状土壤中水流建模问题推导分析解的第一步。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

An analytical solution for vertical infiltration in homogeneous bounded profiles

An analytical solution for vertical infiltration in homogeneous bounded profiles

In this study, we derive an analytical solution to address the problem of vertical infiltration within 1D homogeneous bounded profiles. Initially, we consider the Richards equation together with Dirichlet boundary conditions. We assume constant diffusivity and linear dependence between the conductivity and the water content, resulting to a linear partial differential equation of diffusion type. To solve the simplified initial boundary value problem over a finite interval, we apply the unified transform, commonly known as the Fokas method. Through this methodology, we obtain an integral representation of the solution that can be efficiently and directly computed numerically, yielding a convergent scheme. We examine various cases, and we compare our solution with well-known approximate solutions. This work can be seen as a first step to derive analytical solutions for the far more difficult and complex problem of modelling water flow in heterogeneous layered soils.

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来源期刊
European Journal of Soil Science
European Journal of Soil Science 农林科学-土壤科学
CiteScore
8.20
自引率
4.80%
发文量
117
审稿时长
5 months
期刊介绍: The EJSS is an international journal that publishes outstanding papers in soil science that advance the theoretical and mechanistic understanding of physical, chemical and biological processes and their interactions in soils acting from molecular to continental scales in natural and managed environments.
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