On the effect of a large cloud of rigid particles on the motion of an incompressible non--Newtonian fluid

Abstract

We show that the collective effect of N rigid bodies (Sn,N)n=1N of diameters (rn,N)n=1N immersed in an incompressible non--Newtonian fluid is negligible in the asymptotic limit N ∞ as long as their total packing volume Σn=1N rn,Nd, d=2,3 tends to zero exponentially -- Σn=1N rn,Nd ≈ A-N -- for a certain constant A > 1. The result is rather surprising and in a sharp contrast with the associated homogenization problem, where the same number of obstacles can completely stop the fluid motion in the case of shear thickening viscosity. A large class of non--Newtonian fluids is included, for which the viscous stress is a subdifferential of a convex potential.

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