We consider vibration effects on the classical Rayleigh–Be’nard problem and the classical Vadasz (1994, “Stability of Free Convection in a Narrow Porous Layer Subject to Rotation,” Int. Commun. Heat Mass Transfer, 21, pp. 881–890) problem, which includes rotation of a vertical porous layer about the z-axis. In particular, we focus on the influence of the Vadasz number on vibration for small to moderate and large Vadasz numbers. For small to moderate Vadasz numbers, we develop an analogy between the Vadasz problem (Vadasz, 1994, “Stability of Free Convection in a Narrow Porous Layer Subject to Rotation,” Int. Commun. Heat Mass Transfer, 21, pp. 881–890) placed far away from the axis of rotation and classical Rayleigh–Be’nard problem, both of which include the effects of vibration. It is shown here that the stability criteria are identical to the Rayleigh–Be’nard problem with vibration when g=ω2X0. The analysis for the large Vadasz number scaling indicates that a frozen time approximation is appropriate where the effect of vibration is modeled as small variations in the Rayleigh number definition.

1.
Nield
,
D. A.
, and
Bejan
,
A.
, 1995,
Convection in Porous Media
,
Wiley
,
New York
.
2.
Chandrasekar
,
S.
, 1961,
Hydrodynamic and Hydromagnetic Stability
,
Oxford University Press
,
London, UK
.
3.
Vadasz
,
P.
, 1994, “
Stability of Free Convection in a Narrow Porous Layer Subject to Rotation
,”
Int. Commun. Heat Mass Transfer
0735-1933,
21
, pp.
881
890
.
4.
Vadasz
,
P.
, 1996, “
Convection and Stability in a Rotating Porous Layer With Alternating Direction of the Centrifugal Body Force
,”
Int. J. Heat Mass Transfer
0017-9310,
39
(
8
), pp.
1639
1647
.
5.
Vadasz
,
P.
, and
Govender
,
S.
, 1998, “
Two-Dimensional Convection Induced by Gravity and Centrifugal Forces in a Rotating Porous Layer Far Away From the Axis of Rotation
,”
Int. J. Rotating Mach.
1023-621X,
4
(
2
), pp.
73
90
.
6.
Vadasz
,
P.
, and
Govender
,
S.
, 2001, “
Stability and Stationary Convection Induced by Gravity and Centrifugal Forces in a Rotating Porous Layer Distant From the Axis of Rotation
,”
Int. J. Eng. Sci.
0020-7225,
39
, pp.
715
732
.
7.
Govender
,
S.
, 2003, “
Oscillatory Convection Induced by Gravity and Centrifugal Forces in a Rotating Porous Layer Distant From the Axis of Rotation
,”
Int. J. Eng. Sci.
0020-7225,
41
(
6
), pp.
539
545
.
8.
Vadasz
,
P.
, 1998, “
Coriolis Effect on Gravity-Driven Convection in a Rotating Porous Layer Heated From Below
,”
J. Fluid Mech.
0022-1120,
376
, pp.
351
375
.
9.
Gresho
,
P. M.
, and
Sani
,
R. L.
, 1970, “
The Effects of Gravity Modulation on the Stability of a Heated Fluid Layer
,”
J. Fluid Mech.
0022-1120,
40
, pp.
783
806
.
10.
Wadih
,
M.
, and
Roux
,
B.
, 1988, “
Natural Convection in a Long Vertical Cylinder Under Gravity Modulation
,”
J. Fluid Mech.
0022-1120,
193
, pp.
391
415
.
11.
Christov
,
C. I.
, and
Homsy
,
G. M.
, 2001, “
Nonlinear Dynamics of Two-Dimensional Convection in a Vertically Stratified Slot With and Without Gravity Modulation
,”
J. Fluid Mech.
0022-1120,
430
, pp.
335
360
.
12.
Hirata
,
K.
,
Sasaki
,
T.
, and
Tanigawa
,
H.
, 2001, “
Vibrational Effect on Convection in a Square Cavity at Zero Gravity
,”
J. Fluid Mech.
0022-1120,
455
, pp.
327
344
.
13.
Govender
,
S.
, 2004, “
Stability of Convection in a Gravity Modulated Porous Layer Heated From Below
,”
Transp. Porous Media
0169-3913,
57
(
1
), pp.
113
123
.
14.
Govender
,
S.
, 2005, “
Destabilising a Fluid Saturated Gravity Modulated Porous Layer Heated From Above
,”
Transp. Porous Media
0169-3913,
59
(
2
), pp.
215
225
.
15.
Govender
,
S.
, 2005, “
Weak Non-Linear Analysis of Convection in a Gravity Modulated Porous Layer
,”
Transp. Porous Media
0169-3913,
60
(
1
), pp.
33
42
.
16.
Bardan
,
G.
, and
Mojtabi
,
A.
, 2000, “
On the Horton–Rogers–Lapwood Convective Instability With Vertical Vibration
,”
Phys. Fluids
0031-9171,
12
, pp.
2723
2731
.
17.
Pedramrazi
,
Y.
,
Maliwan
,
K.
,
Charrier–Mojtabi
,
M. C.
, and
Mojtabi
,
A.
, 2005, “
Influence of Vibration on the Onset of Thermoconvection in Porous Medium
,”
Handbook of Porous Media
,
Marcel Dekker
,
New York
, pp.
321
370
.
18.
Govender
,
S.
, 2005, “
Linear Stability and Convection in a Gravity Modulated Porous Layer Heated From Below: Transition From Synchronous to Subharmonic Solution
,”
Transp. Porous Media
0169-3913,
59
(
2
), pp.
227
238
.
19.
Kuznetsov
,
A. V.
, 2006, “
Linear Stability Analysis of the Effect of Vertical Vibration on Bioconvection in a Horizontal Porous Layer of Finite Depth
,”
J. Porous Media
1091-028X,
9
, pp.
597
608
.
20.
Straughan
,
B.
, 2000, “
A Sharp Nonlinear Stability Threshold in Rotating Porous Convection
,”
Proc. R. Soc. London, Ser. A
0950-1207,
457
, pp.
87
93
.
21.
McLachlan
,
N. W.
, 1964,
Theory and Application of Mathieu Functions
,
Dover
,
New York
.
You do not currently have access to this content.