Squeeze flow of a Carreau fluid during sphere impact

We present results from a combined numerical and experimental investigation into the squeeze flow induced when a solid sphere impacts onto a thin, ultra-viscous film of non-Newtonian fluid. We examine both the sphere motion through the liquid as well as the fluid flow field in the region directly beneath the sphere during approach to a solid plate. In the experiments we use silicone oil as the model fluid, which is well-described by the Carreau model. We use high-speed imaging and particle tracking to achieve flow visualisation within the film itself and derive the corresponding velocity fields. We show that the radial velocity either diverges as the gap between the sphere and the wall diminishes (Ztip → 0) or that it reaches a maximum value and then decays rapidly to zero as the sphere comes to rest at a non-zero distance (Ztip = Zmin) away from the wall. The horizontal shear rate is calculated and is responsible for significant viscosity reduction during the approach of the sphere. Our model of this flo...

[1]  D. Joseph,et al.  Particle-wall collision in a viscoelastic fluid , 2009, Journal of Fluid Mechanics.

[2]  Robert H. Davis,et al.  Elastohydrodynamic rebound of spheres from coated surfaces , 2002, Journal of Fluid Mechanics.

[3]  C. Servais,et al.  Squeeze flow theory and applications to rheometry: A review , 2005 .

[4]  H. Brenner The slow motion of a sphere through a viscous fluid towards a plane surface , 1961 .

[5]  E. J. Hinch,et al.  The elastohydrodynamic collision of two spheres , 1986, Journal of Fluid Mechanics.

[6]  A. Mongruel,et al.  The approach of a sphere to a wall at finite Reynolds number , 2010, Journal of Fluid Mechanics.

[7]  Suresh G. Advani,et al.  Transverse squeeze flow of concentrated aligned fibers in viscous fluids , 1996 .

[8]  J. Sherwood Squeeze flow of a power-law fluid between non-parallel plates , 2011 .

[9]  Robert H. Davis,et al.  The influence of pressure-dependent density and viscosity on the elastohydrodynamic collision and rebound of two spheres , 1989, Journal of Fluid Mechanics.

[10]  Gregory J. Rodin,et al.  Squeeze film between two spheres in a power-law fluid , 1996 .

[11]  R. Byron Bird,et al.  Squeezing Flow between Parallel Disks. I. Theoretical Analysis , 1974 .

[12]  G. Lian,et al.  On the squeeze flow of a power-law fluid between rigid spheres , 2001 .

[13]  B. Edmondson,et al.  An experimental and theoretical study of the squeeze-film deformation and flow of elastoplastic fluids , 1994 .

[14]  Robert H. Davis,et al.  Elastohydrodynamic collision and rebound of spheres: Experimental verification , 1988 .

[15]  W. K. Ng,et al.  Cavitation structures formed during the rebound of a sphere from a wetted surface , 2011 .

[16]  G. Lian,et al.  Elastohydrodynamic collisions of solid spheres , 1996, Journal of Fluid Mechanics.

[17]  S. Thoroddsen,et al.  Direct verification of the lubrication force on a sphere travelling through a viscous film upon approach to a solid wall , 2010, Journal of Fluid Mechanics.

[18]  G. Meeten Squeeze flow between plane and spherical surfaces , 2001 .

[19]  Howard Brenner,et al.  The slow motion of a sphere through a viscous fluid towards a plane surface. II - Small gap widths, including inertial effects. , 1967 .

[20]  Robert H. Davis,et al.  Stokes' cradle: normal three-body collisions between wetted particles , 2009, Journal of Fluid Mechanics.