具有耦合应力和广义麦克斯韦-卡塔尼奥定律的布林克曼-达西-开尔文-伏依格特流体中的对流传热

IF 4.1 2区 工程技术 Q1 MECHANICS
Saravanan P, Amit Mahajan
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引用次数: 0

摘要

本文研究了饱和布林克曼-达西型多孔介质的开尔文-沃伊特流体中的热对流。我们研究了这种流体在具有耦合应力效应的广义麦克斯韦-卡塔尼奥定律下的线性(静止和振荡)、非线性和无条件非线性稳定性。利用法向模式技术,我们计算了静止和振荡对流在无应力边界条件下线性稳定性的临界瑞利数。此外,我们还采用能量法确定了相同边界条件下非线性和无条件非线性稳定性的临界瑞利数。所有临界值都是通过数值确定的,并绘制了各种图表来说明结果。我们的研究结果表明,耦合应力参数越高,静止、振荡和非线性稳定性的临界雷利数越大,这表明流体稳定性越强,对流的敏感性越低。此外,Kelvin-Voigt 参数对振荡对流有显著影响,尽管它在非线性稳定性框架内仍然至关重要。这些发现让我们对这一复杂流体系统的稳定性行为有了详细的了解。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Convective heat transfer in Brinkman–Darcy–Kelvin–Voigt fluid with couple stress and generalized Maxwell–Cattaneo law
This article investigates thermal convection in Kelvin–Voigt fluids saturating a Brinkman–Darcy-type porous medium. We examine the linear (stationary and oscillatory), nonlinear, and unconditional nonlinear stability of this fluid under the generalized Maxwell–Cattaneo law with couple stress effects. Using the normal mode technique, we calculate the critical Rayleigh number for the linear stability under stress-free boundary conditions for both stationary and oscillatory convection. Additionally, we employ the energy method to determine the critical Rayleigh number for nonlinear and unconditional nonlinear stabilities under the same boundary conditions. All critical values were determined numerically, and various graphs were plotted to illustrate the results. Our findings reveal that a higher couple stress parameter leads to increased critical Rayleigh numbers for stationary, oscillatory, and nonlinear stability, indicating greater fluid stability and reduced susceptibility to convection. Additionally, the Kelvin–Voigt parameter significantly affects oscillatory convection, though it remains crucial within the nonlinear stability framework. These findings provide a detailed understanding of the stability behavior in this complex fluid system.
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来源期刊
Physics of Fluids
Physics of Fluids 物理-力学
CiteScore
6.50
自引率
41.30%
发文量
2063
审稿时长
2.6 months
期刊介绍: Physics of Fluids (PoF) is a preeminent journal devoted to publishing original theoretical, computational, and experimental contributions to the understanding of the dynamics of gases, liquids, and complex or multiphase fluids. Topics published in PoF are diverse and reflect the most important subjects in fluid dynamics, including, but not limited to: -Acoustics -Aerospace and aeronautical flow -Astrophysical flow -Biofluid mechanics -Cavitation and cavitating flows -Combustion flows -Complex fluids -Compressible flow -Computational fluid dynamics -Contact lines -Continuum mechanics -Convection -Cryogenic flow -Droplets -Electrical and magnetic effects in fluid flow -Foam, bubble, and film mechanics -Flow control -Flow instability and transition -Flow orientation and anisotropy -Flows with other transport phenomena -Flows with complex boundary conditions -Flow visualization -Fluid mechanics -Fluid physical properties -Fluid–structure interactions -Free surface flows -Geophysical flow -Interfacial flow -Knudsen flow -Laminar flow -Liquid crystals -Mathematics of fluids -Micro- and nanofluid mechanics -Mixing -Molecular theory -Nanofluidics -Particulate, multiphase, and granular flow -Processing flows -Relativistic fluid mechanics -Rotating flows -Shock wave phenomena -Soft matter -Stratified flows -Supercritical fluids -Superfluidity -Thermodynamics of flow systems -Transonic flow -Turbulent flow -Viscous and non-Newtonian flow -Viscoelasticity -Vortex dynamics -Waves
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