We study the electrically conducting fluid stability of magnetohydrodynamic flow between parallel plates by Chebyshev collocation method by applied transverse magnetic field. Temporal growth is obtained by the governing equations. The results show that the dominating factor is the change in shape of the undisturbed velocity profile caused by the magnetic field, which depends only on the Hartmann number. The stability equations is solved by QZ-algorithm to find the eigenvalue problem. The numerical calculation show that Magnetic field with particular magnitude destabilizes Couette flow while other magnitude stabilize the flow. It is also analyzed that Rec decreases rapidly to the minimum value for Hartmann number Ha greater than 3.887 and in...
.The problem of equilibrium figures of electro-conducting fluids is studied. It is set the initial b...
A study of Couette flow in cylindrical coordinate under the influence electroconductivity and magnet...
Abstract. The linear stability of plane Poiseuille flow at low Reynolds number of a con-ducting Oldr...
The effect of a uniform vertical magnetic field on the stability of pressure-driven flow of an elect...
AbstractIn this paper, we apply Homotopy Perturbation Method (HPM) to find the analytical solutions ...
In this paper, we apply Homotopy Perturbation Method (HPM) to find the analytical solutions of nonli...
The stability of a viscous, incompressible, electrically conducting fluid with a free surface in a t...
This article investigates the impact of a sudden application or sudden withdrawal of a magnetic fiel...
An analysis of a generalised magnetohydrodynamic Couette flow of a viscous, incompressible, electric...
The stability of viscous flow between two coaxial cylinders maintained by a constant transverse pres...
The flow of an incompressible electrically conducting viscous fluid in convergent or divergent chann...
Shear flow with an applied cross-stream magnetic field is studied using dissipative incompressible m...
The linear stability of plan Poiseuille flow of an electrically conducting viscoelastic fluid in the...
<div><p>The stability of magnetohydrodynamic flow in a duct with perfectly conducting walls is inves...
We study the magnetorotational instability in cylindrical Taylor-Couette flow, with the (vertically ...
.The problem of equilibrium figures of electro-conducting fluids is studied. It is set the initial b...
A study of Couette flow in cylindrical coordinate under the influence electroconductivity and magnet...
Abstract. The linear stability of plane Poiseuille flow at low Reynolds number of a con-ducting Oldr...
The effect of a uniform vertical magnetic field on the stability of pressure-driven flow of an elect...
AbstractIn this paper, we apply Homotopy Perturbation Method (HPM) to find the analytical solutions ...
In this paper, we apply Homotopy Perturbation Method (HPM) to find the analytical solutions of nonli...
The stability of a viscous, incompressible, electrically conducting fluid with a free surface in a t...
This article investigates the impact of a sudden application or sudden withdrawal of a magnetic fiel...
An analysis of a generalised magnetohydrodynamic Couette flow of a viscous, incompressible, electric...
The stability of viscous flow between two coaxial cylinders maintained by a constant transverse pres...
The flow of an incompressible electrically conducting viscous fluid in convergent or divergent chann...
Shear flow with an applied cross-stream magnetic field is studied using dissipative incompressible m...
The linear stability of plan Poiseuille flow of an electrically conducting viscoelastic fluid in the...
<div><p>The stability of magnetohydrodynamic flow in a duct with perfectly conducting walls is inves...
We study the magnetorotational instability in cylindrical Taylor-Couette flow, with the (vertically ...
.The problem of equilibrium figures of electro-conducting fluids is studied. It is set the initial b...
A study of Couette flow in cylindrical coordinate under the influence electroconductivity and magnet...
Abstract. The linear stability of plane Poiseuille flow at low Reynolds number of a con-ducting Oldr...