Title of article
Finite Element Solution of MHD Transient Flow past an Impulsively Started Infinite Horizontal Porous Plate in a Rotating Fluid with Hall Current
Author/Authors
Anand Rao, J. Osmania University - College of Science - Department of Mathematics, India , Srinivasa Raju, R. Padmasri Dr. B. V. Raju Institute of Technology - Department of Basic Science and Humanities, India , Sivaiah, S. Gitam University, Hyderabad Campus - Department of Mathematics, India
From page
105
To page
112
Abstract
The problem of a transient three dimensional MHD flow of an electrically conducting viscous incompressible rotating fluid past an impulsively started infinite horizontal porous plate taking into account the Hall current is presented. It is assumed that the fluid rotates with a constant angular velocity about the normal to the plate and a uniform magnetic field applied along the normal to the plate and directed into the fluid region. The magnetic Reynolds number is assumed to be so small that the induced magnetic field can be neglected. The non-dimensional equations governing the flow are solved by Galerkin finite element method. The expressions for the primary and secondary velocity fieldsare obtained in non-dimensional form. The effects of the physical parameters like M (Hartmann number), Ω (Rotation parameter) and m (Hall parameter) on these fields are discussed through graphs and results are physically interpreted
Keywords
MHD , Hall current , Rotation , Transient , Horizontal porous plate
Journal title
Journal of Applied Fluid Mechanics (JAFM)
Journal title
Journal of Applied Fluid Mechanics (JAFM)
Record number
2591540
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