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Instability and secondary motion in a rotating channel flow

Published online by Cambridge University Press:  29 March 2006

John E. Hart
John E. Hart
Affiliation:
Department of Meteorology, M.I.T. Present address: D.A.M.T.P., Cambridge University.
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Abstract

An experiment with the pressure-driven flow down a long rotating channel is described. For zero rotation the flow is quasi-parabolic, laminar, and one-dimensional up the channel. With slight rotation Ω there is a weak double-vortex secondary circulation aligned with the channel. At intermediate Ω there exists an instability in the form of logitudinal rolls of non-dimensional wavenumber 5. The instability disappears at high rotation rates.

The general stability problem for a rotating zonal flow $\overline{U}(y)$ is considered theoretically. For perturbations independent of the co-ordinate in the direction of the flow, the problem is exactly analogous to the stability problem of a temperature-stratified fluid where the stratification $\overline{T}_z(z)$ corresponds to the quantity \[ (\partial\overline{U}/\partial y)(1/2\Omega)-1. \] This analogy extends to much more general mean fields (e.g. non-linear or time dependent) than does the oft-quoted analogy between thermal convection and cylindrical Couette flow. The instability theory is in qualitative agreement with the experiment.

Type
Research Article
Information
Journal of Fluid Mechanics , Volume 45 , Issue 2 , 30 January 1971 , pp. 341 - 351
Copyright
© 1971 Cambridge University Press

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References

Baker, D. J. 1966 A technique for precise measurement of small fluid velocities J. Fluid Mech. 26, 573.Google Scholar
Benton, G. S. 1956 The effects of the earth's rotation on laminar flow in pipes J. Appl. Mech. 23, 123127.Google Scholar
Benton, G. S. & Boyer, D. 1966 Flow through a rapidly rotating conduit of arbitrary cross-section J. Fluid Mech. 26, 69.Google Scholar
Chandrasekhar, S. 1961a Adjoint differential systems in the theory of hydrodynamic stability J. Math. Mech. 10, 683.Google Scholar
Chandrasekhar, S. 1961b Hydrodynamic and Hydromagnetic Stability. Oxford University Press.
Debler, W. R. 1966 On the analogy between thermal and rotational hydrodynamic stability J. Fluid Mech. 24, 165176.Google Scholar
Greenspan, H. P. 1968 The Theory of Rotating Fluids. Cambridge University Press.
Harris, D. L. & Reid, W. H. 1958 On orthogonal functions which satisfy four boundary conditions Astrophys. J. Supp. Ser. 3, 429447.Google Scholar
Hide, R. 1968 On source-sink flows in a rotating fluid J. Fluid Mech. 32, 737764.Google Scholar
Mikhlin, S. G. 1964 Variational Methods in Mathematical Physics. Pergamon.
Pellew, A. & Southwell, R. V. 1940 On maintained convective motion in a fluid heated from below. Proc. Roy. Soc A 176, 312343.Google Scholar
Solberg, H. 1936 Procés Verbaux Méteorol., Union Géod. Géophys. Intern. II. Edinburgh.