Journal ArticleDOI
Some transformations for natural convection on a vertical flat plate embedded in porous media with prescribed wall temperature
Hong-Sen Kou,Der-Kuen Huang +1 more
TLDR
In this paper, the authors analyzed transformation for boundary layer equations for two-dimensional steady natural convection along a vertical flat plate embedded in porous media, and found that similarity solution exists for the whole flow region as the wall temperature distribution is in linear variation and the inertia resistance is without consideration.About:
This article is published in International Communications in Heat and Mass Transfer.The article was published on 1996-03-01. It has received 6 citations till now. The article focuses on the topics: Natural convection & Boundary layer.read more
Citations
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Journal ArticleDOI
Hydromagnetic combined heat and mass transfer by natural convection from a permeable surface embedded in a fluid‐saturated porous medium
TL;DR: In this paper, the problem of coupled heat and mass transfer by natural convection from a vertical, semi-infinite flat plate embedded in a porous medium in the presence of an external magnetic field and internal heat generation or absorption effects is formulated.
Journal ArticleDOI
Variable porosity and thermal dispersion effects on coupled heat and mass transfer by natural convection from a surface embedded in a non‐metallic porous medium
TL;DR: In this paper, the problem of coupled heat and mass transfer by natural convection from a vertical impermeable semi-finite flat plate embedded in a non-uniform non-metallic porous medium in the presence of thermal dispersion effects is formulated.
Journal ArticleDOI
Natural convection over a non-isothermal vertical plate
TL;DR: In this paper, the influence of non-uniformity of wall temperature on the heat transfer by natural convection along a vertical plate having a linearly distributed temperature (characterized by the slope S) is pointed out.
Journal ArticleDOI
Flow of Oldroyd-B Fluid over a Rotating Disk Through Porous Medium with Soret–Dufour Effects
TL;DR: In this paper, a study of the Darcy flow of magnetized Oldroyd-B fluid over a rotating porous disk is analyzed and the heat and mass transport mechanism are analyzed with the significant features of thermal diffusion (Soret) and diffusion thermo (Dufour), also the influence of chemical reaction is also considered on solutal field.
Book ChapterDOI
External Natural Convection
Donald A. Nield,Adrian Bejan +1 more
TL;DR: For small values of the Rayleigh number Ra, perturbation methods are appropriate as mentioned in this paper, and this approach forms the subject of much of the discussion by Cheng (1985a).
References
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Book
Dynamics of fluids in porous media
TL;DR: In this paper, the Milieux poreux Reference Record was created on 2004-09-07, modified on 2016-08-08 and the reference record was updated in 2016.
Journal ArticleDOI
A calculation of the viscous force exerted by a flowing fluid on a dense swarm of particles
TL;DR: In this paper, the viscous force exerted by a flowing fluid on a dense swarm of particles is described by a modification of Darcy's equation, which was necessary in order to obtain consistent boundary conditions.
Journal ArticleDOI
Boundary and inertia effects on flow and heat transfer in porous media
Kambiz Vafai,Chuen-Lin Tien +1 more
TL;DR: In this article, the effects of a solid boundary and the inertial forces on flow and heat transfer in porous media were analyzed, and a new concept of the momentum boundary layer central to the numerical routine was presented.
Book
Physical and Computational Aspects of Convective Heat Transfer
Tuncer Cebeci,Peter Bradshaw +1 more
TL;DR: In this paper, the authors present an analysis of the relationship between mass, momentum, energy, and energy for coupling and uncoupled flows in two-dimensional Laminar and Turbulent boundary layers.
Related Papers (5)
Mixed convection boundary-layer flow over a vertical surface embedded in a porous medium
Natural Convection Boundary-Layer Flow in a Porous Medium with Temperature-Dependent Boundary Conditions
John H. Merkin,I. Pop +1 more