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The effect of stable thermal stratification on the stability of viscous parallel flows

Published online by Cambridge University Press:  29 March 2006

K. S. Gage
K. S. Gage
Affiliation:
Institute for Fluid Dynamics and Applied Mathematics, University of Maryland
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Abstract

A unified linear viscous stability theory is developed for a certain class of stratified parallel channel and boundary-layer flows with Prandtl number equal to unity. Results are presented for plane Poiseuille flow and the asymptotic suction boundary-layer profile, which show that the asymptotic behaviour of both branches of the curve of neutral stability has a universal character. For velocity profiles without inflexion points it is found that a mode of instability disappears as η, the local Richardson number evaluated at the critical point, approaches 0.0554 from below. Calculations for Grohne's inflexion-point profile show both major and minor curves of neutral stability for 0 < η [les ] 0.0554; for \[ 0.0554 < \eta < 0.0773 \] there is only a single curve of neutral stability; and, for η > 0.0773, the curves of neutral stability become closed, with complete stabilization being achieved for a value of η of about 0·107.

Type
Research Article
Information
Journal of Fluid Mechanics , Volume 47 , Issue 1 , 14 May 1971 , pp. 1 - 20
Copyright
© 1971 Cambridge University Press

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References

Drazin, P. G. & Howard, L. N. 1966 Advances in Applied Mechanics. vol. 9 (ed. G. Kuerti), pp. 189. New York: Academic.
Erdelyi, A., Magnus, W., Oberhettinger, F. & Tricomi, G. F. 1953 Higher Transcendental Functions, vol. 1. McGraw-Hill.
Gage, K. S. & Reid, W. H. 1968 J. Fluid Mech. 33, 21.
Gage, K. S. 1968 Ph.D. thesis, University of Chicago.
Grohne, D. 1954 Z. angew. Math. Mech. 34, 344. (Also NACA Tech. Memo. 1417.)
Hughes, T. H. & Reid, W. H. 1965 J. Fluid Mech. 23, 715.
Hughes, T. H. & Reid, W. H. 1968 Phil. Trans. Roy. Soc. A, 263, 57.
Koppel, D. 1964 J. Math. Phys. 5, 963.
Ludlam, F. H. 1967 Quart. J. Roy. Met. Soc. 93, 419.
Miles, J. W. 1961 J. Fluid Mech. 10, 496.
Miles, J. W. 1967 J. Fluid Mech. 28, 305.
Reid, W. H. 1965 Basic Developments in Fluid Dynamics. vol. 1 (ed. M. Holt), pp. 249307. New York: Academic.
Schlichting, H. 1935 Z. angew. Math. Mech. 15, 313. (Also NACA Tech. Memo. 1262.)
Synge, J. L. 1933 Trans. Roy. Soc. Can. 27, 1.