The viscoelastic Kolmogorov flow: eddy viscosity and linear stability

G. BOFFETTA; A. CELANI; A. MAZZINO; A. PULIAFITO; M. VERGASSOLA

doi:10.1017/S0022112004002423

Abstract

The stability properties of the laminar Kolmogorov flow of a viscoelastic Oldroyd-B fluid are investigated both analytically and numerically. Linear stability with respect to large-scale perturbations is studied by means of multiple-scale analysis. This technique yields an effective diffusion equation for the large-scale perturbation where the effective (eddy) viscosity can be computed analytically. Stability amounts to the positive definiteness of the eddy-viscosity tensor as a function of the Reynolds and the Deborah numbers. Two main results emerge from our analysis: (i) at small fluid elasticity, the flow is more stable than in the Newtonian case; (ii) at high elasticity, the flow is prone to elastic instabilities, occurring even at vanishing Reynolds number. The hypothesis of scale separation is verified up to moderate elasticity, as checked by numerical integration of the exact linearized equations by the Arnoldi method. Finally, it is shown that the addition of a stress diffusivity counteracts the effect of elasticity, in agreement with simple physical arguments.

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

BISTAGNINO, A. BOFFETTA, G. CELANI, A. MAZZINO, A. PULIAFITO, A. and VERGASSOLA, M. 2007. Nonlinear dynamics of the viscoelastic Kolmogorov flow. Journal of Fluid Mechanics, Vol. 590, Issue. , p. 61.

Berti, S. Bistagnino, A. Boffetta, G. Celani, A. and Musacchio, S. 2008. Two-dimensional elastic turbulence. Physical Review E, Vol. 77, Issue. 5,

Borovsky, Joseph E. and Denton, Michael H. 2008. A statistical look at plasmaspheric drainage plumes. Journal of Geophysical Research: Space Physics, Vol. 113, Issue. A9,

Steinberg, Victor 2009. Elastic stresses in random flow of a dilute polymer solution and the turbulent drag reduction problem . Comptes Rendus. Physique, Vol. 10, Issue. 8, p. 728.

Berti, S. and Boffetta, G. 2010. Elastic waves and transition to elastic turbulence in a two-dimensional viscoelastic Kolmogorov flow. Physical Review E, Vol. 82, Issue. 3,

BOFFETTA, GUIDO MAZZINO, ANDREA MUSACCHIO, STEFANO and VOZELLA, LARA 2010. Rayleigh–Taylor instability in a viscoelastic binary fluid. Journal of Fluid Mechanics, Vol. 643, Issue. , p. 127.

Kwon, Youngdon 2012. Numerical description of elastic flow instability and its dependence on liquid viscoelasticity in planar contraction. Journal of Rheology, Vol. 56, Issue. 6, p. 1335.

Zilz, J. Poole, R. J. Alves, M. A. Bartolo, D. Levaché, B. and Lindner, A. 2012. Geometric scaling of a purely elastic flow instability in serpentine channels. Journal of Fluid Mechanics, Vol. 712, Issue. , p. 203.

Boi, S. Mazzino, A. and Pralits, J. O. 2013. Minimal model for zero-inertia instabilities in shear-dominated non-Newtonian flows. Physical Review E, Vol. 88, Issue. 3,

Musacchio, S. and Boffetta, G. 2014. Turbulent channel without boundaries: The periodic Kolmogorov flow. Physical Review E, Vol. 89, Issue. 2,

Mussetti, Gianluca Pralits, Jan O. and Mazzino, Andrea 2014. Achieving uniform concentration by optimised dosage in a microchannel. Meccanica, Vol. 49, Issue. 10, p. 2543.

Watanabe, Takeshi and Gotoh, Toshiyuki 2014. Power-law spectra formed by stretching polymers in decaying isotropic turbulence. Physics of Fluids, Vol. 26, Issue. 3,

Gupta, Akanksha Ganesh, R. and Joy, Ashwin 2014. Kolmogorov flow in two dimensional strongly coupled dusty plasma. Physics of Plasmas, Vol. 21, Issue. 7,

Lucas, Dan and Kerswell, Rich 2014. Spatiotemporal dynamics in two-dimensional Kolmogorov flow over large domains. Journal of Fluid Mechanics, Vol. 750, Issue. , p. 518.

Sankar Ray, Samriddhi and Vincenzi, Dario 2016. Elastic turbulence in a shell model of polymer solution. EPL (Europhysics Letters), Vol. 114, Issue. 4, p. 44001.

Plan, Emmanuel L. C. VI M. Musacchio, Stefano and Vincenzi, Dario 2017. Emergence of chaos in a viscous solution of rods. Physical Review E, Vol. 96, Issue. 5,

Plan, Emmanuel Lance Christopher VI M. Gupta, Anupam Vincenzi, Dario and Gibbon, John D. 2017. Lyapunov dimension of elastic turbulence. Journal of Fluid Mechanics, Vol. 822, Issue. ,

Garg, Himani Calzavarini, Enrico Mompean, Gilmar and Berti, Stefano 2018. Particle-laden two-dimensional elastic turbulence. The European Physical Journal E, Vol. 41, Issue. 10,

Kalashnik, Maxim and Kurgansky, Michael 2018. Nonlinear dynamics of long-wave perturbations of the Kolmogorov flow for large Reynolds numbers. Ocean Dynamics, Vol. 68, Issue. 8, p. 1001.

Gupta, Akanksha and Ganesh, Rajaraman 2018. Compressibility effects on a shear flow in strongly coupled dusty plasma. I. A study using computational fluid dynamics. Physics of Plasmas, Vol. 25, Issue. 1,

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The viscoelastic Kolmogorov flow: eddy viscosity and linear stability

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