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Linear stability of Hunt's flow

Published online by Cambridge University Press:  13 April 2010

JĀNIS PRIEDE ,
SVETLANA ALEKSANDROVA  and
SERGEI MOLOKOV
JĀNIS PRIEDE*
Affiliation:
Applied Mathematics Research Centre, Department of Mathematical Sciences, Coventry University, Priory Street, Coventry CV1 5FB, UK
SVETLANA ALEKSANDROVA
Affiliation:
Applied Mathematics Research Centre, Department of Mathematical Sciences, Coventry University, Priory Street, Coventry CV1 5FB, UK
SERGEI MOLOKOV
Affiliation:
Applied Mathematics Research Centre, Department of Mathematical Sciences, Coventry University, Priory Street, Coventry CV1 5FB, UK
*
Email address for correspondence: J.Priede@coventry.ac.uk
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Abstract

We analyse numerically the linear stability of the fully developed flow of a liquid metal in a square duct subject to a transverse magnetic field. The walls of the duct perpendicular to the magnetic field are perfectly conducting whereas the parallel ones are insulating. In a sufficiently strong magnetic field, the flow consists of two jets at the insulating walls and a near-stagnant core. We use a vector stream function formulation and Chebyshev collocation method to solve the eigenvalue problem for small-amplitude perturbations. Due to the two-fold reflection symmetry of the base flow the disturbances with four different parity combinations over the duct cross-section decouple from each other. Magnetic field renders the flow in a square duct linearly unstable at the Hartmann number Ha ≈ 5.7 with respect to a disturbance whose vorticity component along the magnetic field is even across the field and odd along it. For this mode, the minimum of the critical Reynolds number Rec ≈ 2018, based on the maximal velocity, is attained at Ha ≈ 10. Further increase of the magnetic field stabilizes this mode with Rec growing approximately as Ha. For Ha > 40, the spanwise parity of the most dangerous disturbance reverses across the magnetic field. At Ha ≈ 46 a new pair of most dangerous disturbances appears with the parity along the magnetic field being opposite to that of the previous two modes. The critical Reynolds number, which is very close for both of these modes, attains a minimum, Rec ≈ 1130, at Ha ≈ 70 and increases as Rec ≈ 91Ha1/2 for Ha ≫ 1. The asymptotics of the critical wavenumber is kc ≈ 0.525Ha1/2 while the critical phase velocity approaches 0.475 of the maximum jet velocity.

Type
Papers
Information
Journal of Fluid Mechanics , Volume 649 , 25 April 2010 , pp. 115 - 134
Copyright
Copyright © Cambridge University Press 2010

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References

REFERENCES

Bayly, B. J., Orszag, S. & Herbert, T. 1988 Instability mechanisms in shear-flow transitions. Annu. Rev. Fluid Mech. 20, 359391.CrossRefGoogle Scholar
Bühler, L. 2007 Liquid metal magnetohydrodynamics for fusion blankets. In Magnetohydrodynamics – Historical Evolution and Trends (ed. Molokov, S., Moreau, R. & Moffatt, H. K.), pp. 171194, Springer.CrossRefGoogle Scholar
Davidson, P. A. 1995 Magnetic damping of jets and vortices. J. Fluid Mech. 299, 153186.Google Scholar
Davidson, P. A. 1999 Magnetohydrodynamics in materials processing. Annu. Rev. Fluid Mech. 31, 273300.CrossRefGoogle Scholar
Fornberg, B. 1996 A Practical Guide to Pseudospectral Methods. Cambridge University Press.CrossRefGoogle Scholar
Fujimura, K. 1989 Stability of MHD flow through a square duct. UCLA technical report, UCLA–FNT–023, 27pp.Google Scholar
Gelfgat, , Yu., M., Dorofeev, V. S. & Scherbinin, E. V. 1971 Experimental investigation of the velocity structure of an MHD flow in a rectangular channel. Magnetohydrodynamics 7, 2629.Google Scholar
Grossmann, S. 2000 The onset of shear flow turbulence. Rev. Mod. Phys. 72, 603618.Google Scholar
Hunt, J. C. R. 1965 Magnetohydrodynamic flow in rectangular ducts, J. Fluid Mech. 21, 577590.Google Scholar
Jackson, J. D. 1998 Classical Electrodynamics. Wiley, § 6.3.Google Scholar
Kakutani, T. 1964 The hydromagnetic stability of the modified plane Couette flow in the presence of a transverse magnetic field. J. Phys. Soc. Japan 19, 10411057.Google Scholar
Kinet, M., Knaepen, B. & Molokov, S. 2009 Instabilities and transition in magnetohydrodynamic flows in ducts with electrically conducting walls. Phys. Rev. Lett. 103, 154501.Google Scholar
Landau, L. & Lifshitz, E. M. 1987 Fluid Mechanics. Pergamon, § 28.Google Scholar
Lehnert, B. 1952 On the behaviour of an electrically conductive liquid in a magnetic field. Ark. Fys. 5, 6990.Google Scholar
Lifshitz, E. M. & Pitaevskii, L. P. 1981 Physical Kinetics. Pergamon, § 62.Google Scholar
Moffatt, H. K. 1967 On the suppression of turbulence by a uniform magnetic field. J. Fluid Mech. 28, 571592.Google Scholar
Molokov, S. 1993 Fully developed liquid–metal flow in multiple rectangular ducts in a strong uniform magnetic field. Eur. J. Mech. /B Fluids 12, 769787.Google Scholar
Molokov, S. & Bühler, L. 1994 Liquid–metal flow in a U-bend in a strong uniform magnetic field. J. Fluid Mech. 267, 325352.Google Scholar
Moreau, R. 1990 Magnetohydrodynamics. Kluwer.Google Scholar
Mück, B. 2000 Three dimensional simulation of MHD side–layer instabilities. In Fourth Intl PAMIR Conf. “Magnetohydrodynamics at Dawn of Third Millennium”, vol. 1, pp. 297–302. Giens, France.Google Scholar
Platnieks, I. & Freibergs, J. 1972 Turbulence and some problems in the stability of flows with M–shaped velocity profiles. Magnetohydrodynamics 8, 164168.Google Scholar
Reed, C. B. & Picologlou, B. F. 1989 Sidewall flow instabilities in liquid metal MHD flows under blanket relevant conditions. Fusion Tech. 15, 705715.Google Scholar
Stieglitz, R., Barleon, L., Bühler, L. & Molokov, S. 1996 Magnetohydrodynamic flow in a right angle bend in a strong magnetic field. J. Fluid Mech. 326, 91123.CrossRefGoogle Scholar
Tatsumi, T. & Yoshimura, T. 1990 Stability of the laminar flow in a rectangular duct. J. Fluid Mech. 212, 437449.CrossRefGoogle Scholar
Ting, A. L., Walker, J. S., Moon, T. J., Reed, C. B. & Picologlou, B. F. 1991 Linear stability analysis for high-velocity boundary layers in liquid–metal magnetohydrodynamic flows. Intl J. Engng Sci. 29, 939948.Google Scholar
Trefethen, L. N., Trefethen, A. E., Reddy, S. C. & Driscoll, T. A. 1993 Hydrodynamic stability without eigenvalues. Science 261, 578584.CrossRefGoogle ScholarPubMed
Uhlmann, M. 2004 Linear stability analysis of flow in an internally heated rectangular duct. Tech. Rep. 1043, CIEMAT, Madrid, Spain, ISSN .Google Scholar
Uhlmann, M. & Nagata, M. 2006 Linear stability of flow in an internally heated rectangular duct. J. Fluid Mech. 551, 387404.CrossRefGoogle Scholar
Waleffe, F. 1995 Transition in shear flows: nonlinear normality versus non-normal linearity. Phys. Fluids 7, 30603066.CrossRefGoogle Scholar
Wedin, H., Bottaro, A. & Nagata, M. 2009 Three-dimensional travelling waves in a square duct. Phys. Rev. E 79, 065305–065304.Google Scholar