Convection Dynamics in a Brinkman Bidisperse Porous Medium Under Internal Heating

IF 2.6 3区工程技术 Q3 ENGINEERING, CHEMICAL

Transport in Porous Media Pub Date : 2025-09-05 DOI:10.1007/s11242-025-02213-0

F. Capone, R. De Luca, J. A. Gianfrani

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Abstract

This study explores the onset of thermal instability within a bidisperse porous medium saturated with a homogeneous, incompressible fluid, subjected to a non-uniform internal heat generation and constant temperature gradient due to heating from below. The fluid motion is modelled with the Darcy’s law in micropores, while the Brinkman’s law is employed in macropores to ensure a more accurate representation of momentum transfer across different scales. The system is modelled under the Oberbeck–Boussinesq approximation, where density variations are incorporated solely in the buoyancy term, with the fluid density being temperature-dependent. Linear and nonlinear stability analyses are performed and different profiles of depth-dependent heat source are considered to investigate its effect in various physical scenarios. Both analyses lead to a generalized eigenvalue problem that is solved numerically by means of the Chebyshev-\(\tau\) method. The nonlinear stability analysis is carried out in the context of the energy theory by means of the differential constraints method. A golden section algorithm is implemented to determine the critical thresholds for linear and nonlinear stability analyses and discuss their proximity.

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内加热条件下Brinkman双分散多孔介质的对流动力学

本研究探讨了饱和均质不可压缩流体的双分散多孔介质中热不稳定性的开始，该介质受到不均匀的内部产热和由下方加热引起的恒定温度梯度的影响。流体运动在微孔中采用达西定律建模，而在大孔中采用布林克曼定律，以确保更准确地表示不同尺度上的动量传递。该系统在Oberbeck-Boussinesq近似下建模，其中密度变化仅包含在浮力项中，流体密度与温度相关。进行了线性和非线性稳定性分析，并考虑了不同深度相关热源的不同剖面，以研究其在各种物理情况下的影响。这两种分析都导致了一个广义特征值问题，该问题用切比雪夫\(\tau\)方法进行了数值求解。在能量理论的背景下，利用微分约束方法进行了非线性稳定性分析。采用黄金分割算法来确定线性和非线性稳定性分析的临界阈值，并讨论它们的接近性。

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

Transport in Porous Media 工程技术-工程：化工

CiteScore

5.30

自引率

7.40%

发文量

155

审稿时长

4.2 months

期刊介绍： -Publishes original research on physical, chemical, and biological aspects of transport in porous media- Papers on porous media research may originate in various areas of physics, chemistry, biology, natural or materials science, and engineering (chemical, civil, agricultural, petroleum, environmental, electrical, and mechanical engineering)- Emphasizes theory, (numerical) modelling, laboratory work, and non-routine applications- Publishes work of a fundamental nature, of interest to a wide readership, that provides novel insight into porous media processes- Expanded in 2007 from 12 to 15 issues per year. Transport in Porous Media publishes original research on physical and chemical aspects of transport phenomena in rigid and deformable porous media. These phenomena, occurring in single and multiphase flow in porous domains, can be governed by extensive quantities such as mass of a fluid phase, mass of component of a phase, momentum, or energy. Moreover, porous medium deformations can be induced by the transport phenomena, by chemical and electro-chemical activities such as swelling, or by external loading through forces and displacements. These porous media phenomena may be studied by researchers from various areas of physics, chemistry, biology, natural or materials science, and engineering (chemical, civil, agricultural, petroleum, environmental, electrical, and mechanical engineering).