Journal ArticleDOI
Role of slip on the linear stability of a liquid flow through a porous channel
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TLDR
In this article, the linear stability of a liquid flow bounded by slippery and porous walls is studied for infinitesimal disturbances of arbitrary wavenumbers, and the Orr-Sommerfeld type eigenvalue problem is formulated by using the normal mode decomposition and resolved based on the Chebyshev spectral collocation method along with the QZ algorithm.Abstract:
The linear stability of a liquid flow bounded by slippery and porous walls is studied for infinitesimal disturbances of arbitrary wavenumbers. The Orr-Sommerfeld type eigenvalue problem is formulated by using the normal mode decomposition and resolved based on the Chebyshev spectral collocation method along with the QZ algorithm. The results are computed numerically in detail for various values of the flow parameters. The presence of an upper wall slip shows a destabilizing effect on the fluid layer mode, but it shows a stabilizing effect on the porous layer mode. On the other hand, the decreasing value of the depth ratio has a stabilizing effect on the fluid layer mode but it has a destabilizing effect on the porous layer mode. In fact, there occurs a competition between the most unstable porous layer mode and the most unstable fluid layer mode to control the primary instability. The most unstable porous layer mode triggers the primary instability unless the upper wall slip dominates the effect of the porous layer otherwise the most unstable fluid layer mode triggers the primary instability. A new phase boundary is detected in the plane of the depth ratio and slip length, which separates the domain of the most unstable porous layer mode from the domain of the most unstable fluid layer mode.read more
Citations
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Journal ArticleDOI
Linear stability analysis of a surfactant-laden shear-imposed falling film
Farooq Ahmad Bhat,Arghya Samanta +1 more
TL;DR: Wei et al. as discussed by the authors studied the long-wave instability of a shear-imposed liquid flow down an inclined plane, where the free surface of the fluid is covered by an insoluble surfactant.
Journal ArticleDOI
Linear stability of a contaminated fluid flow down a slippery inclined plane
Farooq Ahmad Bhat,Arghya Samanta +1 more
TL;DR: In this paper, the linear stability analysis of a fluid flow down a slippery inclined plane is carried out when the free surface of the fluid is contaminated by a monolayer of insoluble surfactant.
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Linear stability of a plane Couette–Poiseuille flow overlying a porous layer
TL;DR: In this paper, the modal and non-modal linear stability analyses of a three-dimensional plane Couette-Poiseuille flow through a porous channel are studied based on the two-domain approach, where fluid and porous layers are treated as distinct layers separated by an interface.
Journal ArticleDOI
Instabilities in viscosity-stratified two-fluid channel flow over an anisotropic-inhomogeneous porous bottom
TL;DR: In this paper, a linear stability analysis of a pressure driven, incompressible, fully developed laminar Poiseuille flow of immiscible two-fluids of stratified viscosity and density in a horizontal channel bounded by a porous bottom supported by a rigid wall, with anisotropic and inhomogeneous permeability, and a rigid top is examined.
Journal ArticleDOI
Non-modal stability analysis in viscous fluid flows with slippery walls
TL;DR: In this article, a study of optimal temporal and spatial disturbance growths for three-dimensional viscous incompressible fluid flows with slippery walls was carried out under the framework of normal velocity and normal vorticity formulations, where a Chebyshev spectral collocation method was used to solve the governing equations numerically.
References
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Journal ArticleDOI
Boundary conditions at a naturally permeable wall
TL;DR: In this article, a simple theory based on replacing the effect of the boundary layer with a slip velocity proportional to the exterior velocity gradient is proposed and shown to be in reasonable agreement with experimental results.
Journal ArticleDOI
Flow in porous media I: A theoretical derivation of Darcy's law
TL;DR: In this article, the Brinkman correction is used to accommodate ano slip condition at an interface between a porous medium and a bounding solid surface, and the analysis clearly indicates why the Brimmerman correction should not be used to adjust the slip condition.
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.
Journal ArticleDOI
Accurate solution of the Orr–Sommerfeld stability equation
TL;DR: In this article, the Orr-Sommerfeld equation is solved numerically using expansions in Chebyshev polynomials and the QR matrix eigenvalue algorithm.
Journal ArticleDOI
Boundary slip in Newtonian liquids: a review of experimental studies
TL;DR: A review of experimental studies regarding the phenomenon of slip of Newtonian liquids at solid interfaces is provided in this article, with particular attention to the effects that factors such as surface roughness, wettability and the presence of gaseous layers might have on the measured interfacial slip.
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