Instability of Elastic Filaments in Shear Flow Yields First-Normal-Stress Differences
- 17 October 2001
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review Letters
- Vol. 87 (19) , 198301
- https://doi.org/10.1103/physrevlett.87.198301
Abstract
Using slender-body hydrodynamics, we study the flow-induced deformation of a high-aspect-ratio elastic filament. For a filament of zero rest curvature rotating in a viscous linear shear flow, our model predicts a bifurcation to shape instabilities due to compression by the flow, in agreement with experimental observations. Further, nonlinear simulations of this shape instability show that in dilute solutions, flexibility of the fibers causes both increased shear thinning as well as significant nonzero first-normal-stress differences. These stress differences are positive for small-to-moderate deformations, but negative for large-amplitude flexing of the fibers.Keywords
This publication has 22 references indexed in Scilit:
- Twirling and Whirling: Viscous Dynamics of Rotating Elastic FilamentsPhysical Review Letters, 2000
- Viscous Nonlinear Dynamics of Twist and WrithePhysical Review Letters, 1998
- Normal stresses in fibre suspensionsJournal of Non-Newtonian Fluid Mechanics, 1994
- On the dynamics of rods in the theory of Kirchhoff and ClebschArchive for Rational Mechanics and Analysis, 1993
- The flow behavior of fiber suspensions in Newtonian fluids and polymer solutions.Rheologica Acta, 1986
- Mechanics of Solids With Applications to Thin BodiesJournal of Applied Mechanics, 1983
- The deformation of a nearly straight thread in a shearing flow with weak Brownian motionsJournal of Fluid Mechanics, 1976
- The effect of weak Brownian rotations on particles in shear flowJournal of Fluid Mechanics, 1971
- The motion of long slender bodies in a viscous fluid. Part 2. Shear flowJournal of Fluid Mechanics, 1971
- Slender-body theory for particles of arbitrary cross-section in Stokes flowJournal of Fluid Mechanics, 1970