New direction and perspectives in elastic instability and turbulence in various viscoelastic flow geometries without inertia

• Published in: Low temperature physics (Woodbury, N.Y.) Vol. 48; no. 6; pp. 492 - 507
• Main Author: Steinberg, Victor
• Format: Journal Article
• Language: English
• Published: Melville American Institute of Physics 01.06.2022
• Subjects: Bifurcations; Channel flow; Drag reduction; Elastic instability; Elastic waves; Elasticity; Flow resistance; Flow stability; Fluid dynamics; Magnetohydrodynamic turbulence; Magnetohydrodynamic waves; Magnetohydrodynamics; Shear flow; Turbulent flow; Velocity; Velocity distribution; Viscoelasticity; elastic turbulence; elastic instability; viscoelastic inertialess flows
• ISSN: 1063-777X; 1090-6517
• DOI: 10.1063/10.0010445

We shortly describe the main results on elastically driven instabilities and elastic turbulence in viscoelastic inertialess flows with curved streamlines. Then we describe a theory of elastic turbulence and prediction of elastic waves Re ≪ 1 and Wi ≫ 1, which speed depends on the elastic stress similar to the Alfvén waves in magneto-hydrodynamics and in a contrast to all other, which speed depends on medium elasticity. Since the established and testified mechanism of elastic instability of viscoelastic flows with curvilinear streamlines becomes ineffective at zero curvature, so parallel shear flows are proved linearly stable, similar to Newtonian parallel shear flows. However, the linear stability of parallel shear flows does not imply their global stability. Here we switch to the main subject, namely a recent development in inertialess parallel shear channel flow of polymer solutions. In such flow, we discover an elastically driven instability, elastic turbulence, elastic waves, and drag reduction down to relaminarization that contradict the linear stability prediction. In this regard, we discuss briefly normal versus non-normal bifurcations in such flows, flow resistance, velocity and pressure fluctuations, and coherent structures and spectral properties of a velocity field as a function of Wi at high elasticity number.