Transport in Porous Media, Vol.77, No.2, 207-228, 2009
A Summary of New Predictive High Frequency Thermo-Vibrational Models in Porous Media
In this paper, we consider the effect of mechanical vibration on the onset of convection in porous media. The porous medium is saturated either by a pure fluid or by a binary mixture. The importance of a transport model on stability diagrams is presented and discussed. The stability threshold for the Darcy-Brinkman case in the Ra (Tc) -R and k (c) -R diagrams is presented (where Ra (Tc) , k (c) and R are the critical Rayleigh number, the critical wave number and the vibration parameters, respectively). It is shown that there is a significant deviation from the Darcy model. In the thermo-solutal case with the Soret effect, the influence of vibration on the reduction of multi-cellular convection is emphasized. A new analytical relation for obtaining the threshold of mono-cellular convection is derived. This relation shows how the separation factor I is related to the controlling parameters of the problem, I = f (R, epsilon*, Le), when the wave number k -> 0. The importance of vibrational parameter definition is highlighted and it is shown how, by using a proper definition for vibrational parameter, we may obtain compact relationship. It is also shown how this result may be used to increase component separation.
Keywords:Porous media;Darcy-Brinkman model;Scale analysis method;High-frequency vibration;Double diffusive convection;Soret effect;Linear stability;Long-wave mode;Separation