A new viscoelastic benchmark flow: Stationary bifurcation in a cross-slot

In this work we propose the cross-slot geometry as a candidate for a numerical benchmark flow problem for viscoelastic fluids. Extensive data of quantified accuracy is provided, obtained via Richardson extrapolation to the limit of infinite refinement using results for three different mesh resolutions, for the upperconvected Maxwell, Oldroyd-B and the linear form of the simplified Phan-Thien–Tanner constitutive models. Furthermore, we consider two types of flow geometry having either sharp or rounded corners, the latter with a radius of curvature equal to 5% of the channel’s width. We show that for all models the inertialess steady symmetric flow may undergo a bifurcation to a steady asymmetric configuration, followed by a second transition to time-dependent flow, which is in qualitative agreement with previous experimental observations for low Reynolds number flows. The critical Deborah number for both transi

[1]  R. Larson Instabilities in viscoelastic flows , 1992 .

[2]  R. Poole,et al.  Geometric scaling of a purely elastic flow instability in serpentine channels , 2011, Journal of Fluid Mechanics.

[3]  R. Poole,et al.  Purely-elastic flow asymmetries in flow-focusing devices , 2008 .

[4]  F. Pinho,et al.  Numerical simulation of non-linear elastic flows with a general collocated finite-volume method , 1998 .

[5]  F. Pinho,et al.  Purely elastic instabilities in three-dimensional cross-slot geometries , 2010 .

[6]  J. Oldroyd On the formulation of rheological equations of state , 1950, Proceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences.

[7]  A. Shen,et al.  Elastic instabilities in a microfluidic cross-slot flow of wormlike micellar solutions , 2012 .

[8]  Gareth H. McKinley,et al.  Investigating the stability of viscoelastic stagnation flows in T-shaped microchannels , 2009 .

[9]  G. G. Peters,et al.  A 3D numerical/experimental study on a stagnation flow of a polyisobutylene solution 1 Dedicated to , 1998 .

[10]  L. G. Leal,et al.  Computational studies of nonlinear elastic dumbbell models of Boger fluids in a cross-slot flow , 1999 .

[11]  Michael D. Graham,et al.  A mechanism for oscillatory instability in viscoelastic cross-slot flow , 2007, Journal of Fluid Mechanics.

[12]  G. McKinley,et al.  Extensional rheology and elastic instabilities of a wormlike micellar solution in a microfluidic cross-slot device , 2012 .

[13]  E. Pike,et al.  Photon-correlation velocimetry of polystyrene solutions in extensional flow fields , 1982 .

[14]  Eric S. G. Shaq PURELY ELASTIC INSTABILITIES IN VISCOMETRIC FLOWS , 1996 .

[15]  Robert J. Poole,et al.  Divergent flow in contractions , 2007 .

[16]  G. Taylor Stability of a Viscous Liquid Contained between Two Rotating Cylinders , 1923 .

[17]  S. D. Hudson,et al.  Rheo-optics of Equilibrium Polymer Solutions: Wormlike Micelles in Elongational Flow in a Microfluidic Cross-Slot , 2006 .

[18]  Raanan Fattal,et al.  Constitutive laws for the matrix-logarithm of the conformation tensor , 2004 .

[19]  E. Hinch,et al.  Do we understand the physics in the constitutive equation , 1988 .

[20]  Joel H. Ferziger,et al.  FURTHER DISCUSSION OF NUMERICAL ERRORS IN CFD , 1996 .

[21]  P. Arratia,et al.  Elastic instabilities of polymer solutions in cross-channel flow. , 2006, Physical review letters.

[22]  H. Wilson Open mathematical problems regarding non-Newtonian fluids , 2012 .

[23]  Fernando T. Pinho,et al.  Dynamics of high-Deborah-number entry flows: a numerical study , 2011 .

[24]  Ronald G. Larson,et al.  A purely elastic instability in Taylor–Couette flow , 1990, Journal of Fluid Mechanics.

[25]  N. Phan-Thien A Nonlinear Network Viscoelastic Model , 1978 .

[26]  Raanan Fattal,et al.  Flow of viscoelastic fluids past a cylinder at high Weissenberg number : stabilized simulations using matrix logarithms , 2005 .

[27]  Robert J. Poole,et al.  On Extensibility Effects in the Cross‐slot Flow Bifurcation , 2008 .

[28]  G. McKinley,et al.  Stagnation point flow of wormlike micellar solutions in a microfluidic cross-slot device: effects of surfactant concentration and ionic environment. , 2012, Physical review. E, Statistical, nonlinear, and soft matter physics.

[29]  L. G. Leal,et al.  The stability of two-dimensional linear flows of an Oldroyd-type fluid , 1985 .

[30]  R. Tanner,et al.  A new constitutive equation derived from network theory , 1977 .

[31]  R. Poole,et al.  Purely elastic flow asymmetries. , 2007, Physical review letters.

[32]  F. Pinho,et al.  A convergent and universally bounded interpolation scheme for the treatment of advection , 2003 .

[33]  G. McKinley,et al.  Rheological and geometric scaling of purely elastic flow instabilities , 1996 .

[34]  F. Pinho,et al.  The log-conformation tensor approach in the finite-volume method framework , 2009 .