Hydromagnetic Forced Flow of Reiner-Rivlin Fluid against a Rotating Disk

概要

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This study presents the hydromagnetic and cross-viscous effects on the forced flow of a non-Newtonian liquid against a rotating disk. The problem has been solved by using Karman-Pohlhausen method. It is found that the cross-viscous and magnetic effects depend on two non-dimensional numbers R_o and m respectively. Numerical solutions have been obtained. for the radial shear stress, torque acting on the disk, boundary layer thicness and the dimensionless moment coefficient for various values of R_c and m. The effct of cross-viscosity is to decrease the magnitudes of the radial and tangential components of the velocity. The radial velocity component of the fluid increases while the tangential component decreases as the strength of the magnetic field increases.
社団法人日本物理学会の論文
1966-07-05