International Journal of Applied Mathematics and Computation | |
Green element numerical solution of generalized Couette flow with heat transfer | |
Okey Oseloka Onyejekwe1  | |
[1] Computational science programAddis Ababa UniversityAddis Ababa, Ethiopia$$ | |
关键词: Green element method; singular integral theory; boundary element method; conducting fluid; Hartmann number; | |
DOI : 10.0000/ijamc.2013.5.2.537 | |
来源: PSIT Kanpur | |
【 摘 要 】
This paper provides a Green element method (GEM) numerical analysis of the effects of a uniform transverse magnetic field on fluid flow. The Green element method is a robust numerical scheme that evolved essentially from the singular integral theory of the boundary element method (BEM) with the unique variety of numerically implementing the theory by the finite element procedure. One of the advantages inherent in this approach is that the coefficient matrix from the discrete equations of the assembled element equations is banded and amenable to numerical solution. For the purposes of this study, the fluid is incompressible, and electrically conducting, and flows between two parallel plates, one of which is moving with a uniform speed while the other is stationary. The depth of the channel is taken to be much smaller than the width and the channel is considered to be very long in the horizontal direction. As a result, the flow is assumed to be fully developed and driven by a pressure gradient in a uniform magnetic field. Numerical solutions obtained with GEM closely match analytical results. In order to validate the physics and numerics of the problem formulation, comprehensive parametric studies are carried out to show the effects on flow and electromagnetic fields of Hartmann number, pressure gradient, current distributions, and temperature .
【 授权许可】
Unknown
【 预 览 】
Files | Size | Format | View |
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RO201912040531215ZK.pdf | 500KB | download |