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doi:10.1016/0377-0257(94)80015-4 
Copyright © 1994 Published by Elsevier Science B.V. All rights reserved.
Aggregation and dispersion of spheres falling in viscoelastic liquids
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D. D. Joseph, Y. J. Liu, M. Poletto and J. Feng
Received 8 November 1993.
| Referred to by: | | Errata Journal of Non-Newtonian Fluid Mechanics, Volume 56, Issue 2, February 1995, Page 217  PDF (34 K)
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Abstract
This paper focuses on the settling on one sphere near another or near a wall. We find maximum differences between Newtonian and viscoelastic liquids, with repulsion between nearby bodies in the Newtonian case and attraction in the viscoelastic case. Side-by-side arrangements of sedimenting spheres are unstable in exactly the same way that broadside-on settling of long bodies is unstable at subcritical speeds in a viscoelastic fluid. The line of centers between the spheres rotates from across to along the stream as the spheres are sucked together. The resulting chain of two spheres is a long body which is stable when the line between centers is parallel to the fall, but this configuration breaks up at subcritical speeds where inertia again dominates. To explain the orientation of particles in the supercritical case, we correlate the aggregative power of a viscoelastic fluid with a zero shear value of the coefficient of ratio of the first normal stress difference to the shear stress and for exceptional cases we introduce the idea of the memory of shear-thinning leading to corridors of reduced viscosity.
Author Keywords: Aggregation of spheres; Dispersion of spheres; Elastic stress ratio; Newtonian liquids; Numerical simulation; Settling of spheres; Sphere-sphere interaction; Viscoelastic liquids; Wall-sphere interaction
