Effect of Non-Uniform Temperature Gradient and Magnetic Field on Marangoni and Benard-Marangoni Convection
The problem of thermal convection in a fluid layer driven by either buoyancy (Bénard) or thermocapillary (Marangoni) effects has recently been assumed importance in material processing. In this study, the problems of Marangoni and Bénard-Marangoni convection in a horizontal fluid layer are theore...
Saved in:
| 主要作者: | |
|---|---|
| 格式: | Thesis |
| 语言: | English English |
| 出版: |
2010
|
| 主题: | |
| 在线阅读: | http://psasir.upm.edu.my/id/eprint/10087/1/IPM_2010_1_A.pdf |
| 标签: |
添加标签
没有标签, 成为第一个标记此记录!
|
| 总结: | The problem of thermal convection in a fluid layer driven by either buoyancy (Bénard)
or thermocapillary (Marangoni) effects has recently been assumed importance in
material processing. In this study, the problems of Marangoni and Bénard-Marangoni
convection in a horizontal fluid layer are theoretically considered. The fluid layer is
bounded from below by a rigid boundary and above by a non-deformable free surface. A
linear stability analysis is applied to the problem, and the effect of non-uniform
temperature profiles and magnetic field are examined. The critical Marangoni numbers
are obtained for free-slip and isothermal, and no-slip and adiabatic lower boundary with
adiabatic temperature on upper free surface. Six non-uniform basic temperature profiles
which are linear, inverted parabola, parabola, step function (superposed two-fluid layer),
piecewise linear (heated from below) and piecewise linear (cooled from above) are
considered. The eigenvalues are obtained and solved using single-term Galerkin expansion procedure. The influence of various parameters such as Chandrasekhar
number and thermal depth on the convection has been analysed. Finally, we showed that
the inverted parabola is most stabilizing basic temperature distribution, and the step
function is the most destabilizing basic temperature distribution. We have also proved
that magnetic field suppressed Marangoni and Bénard-Marangoni convection. |
|---|