Litcius/Paper detail

Numerical study of viscoelastic upstream instability

Sai Peng, Tingting Tang, Jianhui Li, Mengqi Zhang, Peng Yu

2023Journal of Fluid Mechanics11 citationsDOI

Abstract

In this work, we report numerical results on the flow instability and bifurcation of a viscoelastic fluid in the upstream region of a cylinder in a confined narrow channel. Two-dimensional direct numerical simulations based on the FENE-P model (the finite-extensible nonlinear elastic model with the Peterlin closure) are conducted with numerical stabilization techniques. Our results show that the macroscopic viscoelastic constitutive relation can capture the viscoelastic upstream instability reported in previous experiments for low-Reynolds-number flows. The numerical simulations reveal that the non-dimensional recirculation length ( L D ) is affected by the cylinder blockage ratio ( BR ), the Weissenberg number ( Wi ), the viscosity ratio ( β ) and the maximum polymer extension ( L ). Close to the onset of upstream recirculation, L D with Wi satisfy Landau-type quartic potential under certain parameter space. The bifurcation may exhibit subcritical behaviour depending on the values of L 2 and β . The parameters β and L 2 have nonlinear influence on the upstream recirculation length. This work contributes to our theoretical understanding of this new instability mechanism in viscoelastic wake flows.

Topics & Concepts

MechanicsInstabilityViscoelasticityReynolds numberWeissenberg numberPhysicsBifurcationCylinderDimensionless quantityNonlinear systemFlow (mathematics)Classical mechanicsTurbulenceMathematicsThermodynamicsGeometryQuantum mechanicsRheology and Fluid Dynamics StudiesFluid Dynamics and Vibration AnalysisFluid Dynamics and Turbulent Flows