Slowing down convective instabilities in corrugated Couette–Poiseuille flow

Abstract: Couette–Poiseuille (CP) flow in the presence of longitudinal grooves is studied by means of numerical analysis. The flow is actuated by movement of the flat wall and pressure imposed in the opposite direction. The stationary wall features longitudinal grooves that modify the flow, change hydrodynamic drag on the driving wall and cause onset of hydrodynamic instability in the form of travelling waves with a consequent supercritical bifurcation, already at moderate ranges of the Reynolds number. We show that by … Show more

“…Gepner et al [29] focused on the nonlinear solutions of the velocity field generated by the flow limited by two corrugated plates and the effect of the induced secondary currents enhancing diffusive transport. Yadav and Gepner [30] studied the effect on the flow instabilities for a geometry consisting in a fixed corrugated bottom plate and an upper moving plane plate. Later, Gepner and Floryan [31] approached numerically the flow driven by a pressure gradient of a fluid bounded by two sinusoidal walls which are in phase in flows at low and moderate sub-turbulent Reynolds numbers.…”

Velocity Field due to a Vertical Deformation of the Bottom of a Laminar Free-Surface Fluid Flow

“…Gepner et al [29] focused on the nonlinear solutions of the velocity field generated by the flow limited by two corrugated plates and the effect of the induced secondary currents enhancing diffusive transport. Yadav and Gepner [30] studied the effect on the flow instabilities for a geometry consisting in a fixed corrugated bottom plate and an upper moving plane plate. Later, Gepner and Floryan [31] approached numerically the flow driven by a pressure gradient of a fluid bounded by two sinusoidal walls which are in phase in flows at low and moderate sub-turbulent Reynolds numbers.…”

Velocity Field due to a Vertical Deformation of the Bottom of a Laminar Free-Surface Fluid Flow