Journal ArticleDOI
Long-Wave Instabilities in a Non-Newtonian Film on a Nonuniformly Heated Inclined Plane
I. Mohammed Rizwan Sadiq,R. Usha +1 more
TLDR
In this paper, a thin liquid layer of a non-Newtonian film falling down an inclined plane that is subjected to non-uniform heating has been considered and a nonlinear evolution equation is derived by applying the long-wave theory, and the equation governs the evolution of a power-law film flowing down a nonuniformly heated inclined plane.Abstract:
A thin liquid layer of a non-Newtonian film falling down an inclined plane that is subjected to nonuniform heating has been considered. The temperature of the inclined plane is assumed to be linearly distributed and the case when the temperature gradient is positive or negative is investigated. The film flow is influenced by gravity, mean surface tension, and thermocapillary forces acting along the free surface. The coupling of thermocapillary instability and surface-wave instabilities is studied for two-dimensional disturbances. A nonlinear evolution equation is derived by applying the long-wave theory, and the equation governs the evolution of a power-law film flowing down a nonuniformly heated inclined plane. The linear stability analysis shows that the film flow system is stable when the plate temperature decreases in the downstream direction while it is less stable for increasing temperature along the plate. Weakly nonlinear stability analysis using the method of multiple scales has been investigated and this leads to a secular equation of the Ginzburg-Landau type. The analysis shows that both supercritical stability and subcritical instability are possible for the film flow system. The results indicate the existence of finite-amplitude waves, and the threshold amplitude and nonlinear speed of these waves are influenced by thermocapillarity. The nonlinear evolution equation for the film thickness is solved numerically in a periodic domain in the supercritical stable region, and the results show that the shape of the wave is influenced by the choice of wave number, non-Newtonian rheology, and nonuniform heating.read more
Citations
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Journal ArticleDOI
Shear-thinning film on a porous substrate: Stability analysis of a one-sided model
TL;DR: In this article, the effects of shear-thinning rheology and bottom permeability of the substrate on the stability of the film flow system are investigated, and the problem is solved analytically for long waves in the limiting cases of weakly and strongly non-Newtonian behaviors.
Journal ArticleDOI
Instability of gravity-driven flow of a heated power-law fluid with temperature dependent consistency
TL;DR: In this paper, the instability of a liquid layer flowing along a heated inclined plane was investigated and a theoretical model with a power-law constitutive relation was developed to capture the temperature variation in the rheology of the fluid.
Journal ArticleDOI
Thermocapillary instabilities of a shear–thinning fluid falling over a porous layer
TL;DR: In this paper, the stability of the steady uniform flow of a power-law fluid down an inclined porous layer heated from below is investigated by means of a two-layer model.
Journal ArticleDOI
Steady solution of an inverse problem in gravity-driven shear-thinning film flow: Reconstruction of an uneven bottom substrate
TL;DR: In this article, the authors consider a thin film of a power-law fluid flowing over an undulated substrate under the action of gravity and derive a set of two evolution equations for the film thickness h and the flow rate q.
Journal ArticleDOI
The mechanism of long-wave instability in a shear-thinning film flow on a porous substrate
TL;DR: In this article, a linear stability analysis of a thin shear-thinning film with a deformable top surface flowing down an inclined porous substrate modelled as a smooth substrate with velocity slip at the wall is examined, and the physical mechanism for the long-wave instability is analyzed.
References
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Journal ArticleDOI
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Journal ArticleDOI
Stability of Liquid Flow down an Inclined Plane
TL;DR: In this paper, the stability of a liquid layer flowing down an inclined plane is investigated, and a new perturbation method is used to furnish information regarding stability of surface waves for three cases: the case of small wavenumbers, of small Reynolds numbers, and of large wavenifications.