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Three-dimensional tertiary motions in a plane shear layer

Published online by Cambridge University Press:  20 April 2006

M. Nagata  and
F. H. Busse
M. Nagata
Affiliation:
Department of Earth and Space Sciences, University of California at Los Angeles
F. H. Busse
Affiliation:
Department of Earth and Space Sciences, University of California at Los Angeles
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Abstract

The nonlinear evolution of instabilities of a plane-parallel shear flow with an inflection-point profile is studied. The particular example of the cubic-profile flow generated in an inclined layer heated from above and cooled from below is chosen because it exhibits supercritical bifurcations for secondary and tertiary flows. Since the limit of small Prandtl number is assumed, buoyancy effects caused by temperature perturbations are negligible. The analysis describes first the transition to transverse roll-like vortices which become unstable at slightly supercritical Grashof numbers to a vortex-pairing instability with alternating pairing in the spanwise direction. Three-dimensional finite-amplitude solutions for this tertiary mode of motion are computed and discussed. Finally the question of the stability of the tertiary flow is addressed.

Type
Research Article
Information
Journal of Fluid Mechanics , Volume 135 , October 1983 , pp. 1 - 26
Copyright
© 1983 Cambridge University Press

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References

Benjamin, T. B. & Feir, J. E. 1967 The disintegration of wave trains on deep water. Part 1. Theory J. Fluid Mech. 27, 417430.Google Scholar
Benney, D. J. & Bergeron, R. F. 1969 A new class of nonlinear waves in parallel flows Stud. Appl. Maths 48, 181204.Google Scholar
Breidenthal, R. 1981 Structure in turbulent mixing layers and wakes using a chemical reaction J. Fluid Mech. 109, 124.Google Scholar
Brown, G. L. & Roshko, A. 1974 On density effects and large structure in turbulent mixing layers J. Fluid Mech. 64, 775816.Google Scholar
Busse, F. H. 1967 On the stability of two-dimensional convection in a layer heated from below J. Maths & Phys. 46, 140150.Google Scholar
Busse, F. H. 1972 The oscillatory instability of convection rolls in a low Prandtl number fluid J. Fluid Mech. 52, 97112.Google Scholar
Busse, F. H. 1981 Transition to turbulence in Rayleigh-Bénard convection. In Hydrodynamic Instabilities and the Transition to Turbulence (ed. H. L. Swinney & J. P. Gollub), pp. 97137. Springer.
Chandrasekhar, S. 1961 Hydrodynamic and Hydromagnetic Stability. Oxford University Press.
Clever, R. M. & Busse, F. H. 1974 Transition to time-dependent convection J. Fluid Mech. 65, 625645.Google Scholar
Craik, A. D. D. 1971 Non-linear resonant instability in boundary layers J. Fluid Mech. 50, 393413.Google Scholar
Diprima, R. C. & Swinney, H. L. 1981 Instabilities and transition in flow between concentric rotating cylinders. In Hydrodynamic Instabilities and the Transition to Turbulence (ed. H. L. Swinney & J. P. Gollub), pp. 139180. Springer.
Eckhaus, W. 1965 Studies in Non-Linear Stability Theory. Springer.
Haberman, R. 1972 Critical layers in parallel flows Stud. Appl. Maths 51, 139161.Google Scholar
Helmholtz, H. Von 1868 On discontinuous movements of fluids (transl. from the German by F. Guthrie) (4) 36, 337346.
Herbert, T. 1981a A secondary instability mechanism in plane Poiseuille flow Bull. Am. Phys. Soc. 26, 1257.Google Scholar
Herbert, T. 1981b Stability of plane Poiseuille flow: theory and experiment. Rep. VPI-E-81-35. Virginia Polytechnic Institute and State University Blacksburg, Va. 24061.Google Scholar
Herbert, T. 1983 Secondary instability of plane channel flow to subharmonic three-dimensional disturbances Phys. Fluids 26, 871874.Google Scholar
Huerre, P. 1980 The nonlinear stability of a free shear layer in the viscous critical layer regime Phil. Trans. R. Soc. Lond. A293, 643675.Google Scholar
Huerre, P. & Scott, J. F. 1980 The effect of critical layer structure on the nonlinear evolution of waves in free shear layers Proc. R. Soc. Lond. A371, 509324.Google Scholar
Kelly, R. E. 1967 On the stability of an inviscid shear layer which is periodic in space and time J. Fluid Mech. 27, 657689.Google Scholar
Kelvin, Lord 1871 Hydrokinetic solutions and observations. Phil. Mag. (4), 42, 362377.Google Scholar
Korpela, S. A., GöZüM, D. & Baxi, C. B. 1973 On the stability of the conduction regime of natural convection in a vertical slot Intl J. Heat Mass Transfer 16, 16831690.Google Scholar
Nagata, M. 1983 Bifurcations in nonlinear problems of hydrodynamic instability of plane parallel shear flows. Ph.D. thesis, University of California, Los Angeles.
Nagata, M. & Busse, F. H. 1981 Secondary motions in a simple plane parallel shear flow Bull. Am. Phys. Soc. 26, 1257.Google Scholar
Orszag, S. A. & Kells, L. C. 1980 Transition to turbulence in plane Poiseuille and plane Couette flow J. Fluid Mech. 96, 159205.Google Scholar
Orszag, S. A. & Patera, A. T. 1980 Subcritical transition to turbulence in plane channel flows Phys. Rev. Lett. 45, 989992.Google Scholar
Pierrehumbert, R. T. & Widnall, S. E. 1982 The two- and three-dimensional instabilities of a spatially periodic shear layer J. Fluid Mech. 114, 5982.Google Scholar
Rayleigh, Lord 1880 On the stability, or instability, of certain fluid motions Proc. Lond. Math. Soc. 11, 5770.Google Scholar
Rudakov, R. N. 1967 Spectrum of perturbations and stability of convective motion between vertical plates Prikl. Mat. Mekh. 31, 349355.Google Scholar
Ruth, D. W. 1979 On the transition to transverse rolls in an infinite vertical fluid layer - a power series solution Intl J. Heat Mass Transfer 22, 11991208.Google Scholar
Schade, H. 1964 Contribution to the nonlinear stability theory of inviscid shear layers Phys. Fluids 7, 623628.Google Scholar
Squire, H. B. 1933 On the stability for three-dimensional disturbances of viscous fluid flow between parallel walls Proc. R. Soc. Lond. A142, 621628.Google Scholar
Stuart, J. T. 1967 On finite amplitude oscillations in laminar mixing layers J. Fluid Mech. 29, 417440.Google Scholar
Stuart, J. T. & Diprima, R. C. 1978 The Eckhaus and Benjamin-Feir Resonance Mechanism Proc. R. Soc. Lond. A362, 2741.Google Scholar
Thomas, A. S. W. & Saric, W. S. 1981 Harmonic and subharmonic waves during boundary layer transition Bull. Am. Phys. Soc. 26, 1252.Google Scholar
Vest, C. M. & Arpaci, V. S. 1969 Stability of natural convection in a vertical slot J. Fluid Mech. 36, 115.Google Scholar