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Rotating axial flow of a continuously separating mixture

Published online by Cambridge University Press:  26 April 2006

A. A. Dahlkild  and
G. Amberg
A. A. Dahlkild
Affiliation:
Department of Mechanics, Royal Institute of Technology, 100 44 Stockholm, Sweden
G. Amberg
Affiliation:
Department of Mechanics, Royal Institute of Technology, 100 44 Stockholm, Sweden
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Abstract

We consider the continuous separation process of a monodispersed suspension flowing axially through a rotating circular cylinder. This stationary problem can be regarded as a basic flow case of rotating mixtures in conjunction with previous studies of time-dependent flows like spin-up and batch settling in a cylinder. The ‘mixture model’ for two-phase flow is used to formulate the problem, which is solved in the range of small Ekman and Rossby numbers by asymptotic analytical methods and by a numerical code. The gradual separation of the axially injected suspension is manifested as a stationary stratification of the mixture which induces a swirl component of the velocity, in analogy with the thermal wind in the Earth's atmosphere. The presence of the azimuthal motion and induced secondary flow due to Ekman-layer pumping clearly influences the character of the stratification. Analytical and numerical results are in excellent agreement.

Type
Research Article
Information
Journal of Fluid Mechanics , Volume 266 , 10 May 1994 , pp. 319 - 346
Copyright
© 1994 Cambridge University Press

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References

Amberg, G., Dahlkild, A. A., Bark, F. H. & Henningson, D. S. 1986 On time-dependent settling of a dilute suspension in a rotating conical channel. J. Fluid Mech. 166, 473502.Google Scholar
Amberg, G. & Greenspan, H. P. 1987 Boundary layers in a sectioned centrifuge. J. Fluid Mech. 181, 7797.Google Scholar
Amberg, G. & Ungarish, M. 1993 Spin-up from rest of a mixture: simulation and theory. J. Fluid Mech. 246, 443464.Google Scholar
Dahlkild, A. A., Amberg, G. & Greenspan, H. P. 1992 Flow in a centrifugal spectrometer. J. Fluid Mech. 238, 221250.Google Scholar
Dahlkild, A. A. & Greenspan, H. P. 1989 On the flow of a rotating mixture in a sectioned cylinder. J. Fluid Mech. 198, 155175.Google Scholar
Goldshtik, M. A. & Javorsky, N. I. 1989 On the flow between a porous rotating disk and a plane. J. Fluid Mech. 207, 128.Google Scholar
Greenspan, H. P. 1983 On centrifugal separation of a mixture. J. Fluid Mech. 127, 91101.Google Scholar
Greenspan, H. P. 1988 On the vorticity of a rotating mixture. J. Fluid Mech. 191, 517528.Google Scholar
Greenspan, H. P. & Ungarish, M. 1985a On the centrifugal separation of a bulk mixture. Intl. J. Multiphase flow 11, 825836.Google Scholar
Greenspan, H. P. & Ungarish, M. 1985b On the enhancement of centrifugal separation. J. Fluid Mech. 157, 359373.Google Scholar
Ishii, M. 1975 Thermo-Fluid Dynamic Theory of Two-Phase Flow. Paris: Eyrolles.
Kan, J. van 1986 A second order accurate pressure-correction scheme for viscous incompressible flow. SIAM J. Sci. Comput. 7, 870891.Google Scholar
Kármán, T. von 1921 Über laminare und turbulente Reibung. Z. Angew. Math. Mech. 1, 233251.Google Scholar
Leighton, D. & Acrivos, A. 1987a Measurement of shear-induced self-diffusion in concentrated suspensions of spheres. J. Fluid Mech. 177, 109131.Google Scholar
Leighton, D. & Acrivos, A. 1987b The shear-induced migration of particles in concentrated suspensions. J. Fluid Mech. 181, 415439.Google Scholar
Nir, A. & Acrivos, A. 1990 Sedimentation and sediment flow on inclined surfaces. J. Fluid Mech. 212, 139153.Google Scholar
Phillips, R. J., Armstrong, R. C. & Brown, R. A. 1992 A constitutive equation for concentrated suspensions that accounts for shear-induced particle migration. Phys. Fluids A 4, 3040.Google Scholar
Rogers, M. H. & Lance, G. N. 1960 The rotationally symmetric flow of a viscous fluid in the presence of an infinite rotating disk. J. Fluid Mech. 7, 617631.Google Scholar
Schaflinger, U. 1987 Enhanced centrifugal separation with finite Rossby numbers in cylinders with compartment walls. Chem. Engng Sci. 42, 1197.Google Scholar
Schaflinger, U. 1990 Centrifugal separation of a mixture. Fluid Dyn. Res. 6, 213249.Google Scholar
Schaflinger, U., Köppl, A. & Filipczak, G. 1986 Sedimentation in cylindrical centrifuges with compartments. Ing. Arch. 56, 321.Google Scholar
Schaflinger, U. & Stibi, H. 1987 On centrifugal separation of suspensions in cylindrical vessels. Acta Mechanica 67, 163181.Google Scholar
Stuart, J. T. 1954 On the effects of uniform suction on the steady flow due to a rotating disk. Q. J. Mech. Appl. Maths VII.Google Scholar
Ungarish, M. 1986 Flow of a separating mixture in a rotating cylinder. Phys. Fluids 29, 640646.Google Scholar
Ungarish, M. 1988a Two fluid analysis of centrifugal separation in a finite cylinder. Intl. J. Multiphase Flow 14, 233243.Google Scholar
Ungarish, M. 1988b On shear layers in a mixture separation within inclined rotating containers. J. Fluid Mech. 193, 2751.Google Scholar
Ungarish, M. 1990 Spin-up from rest of a mixture. Phys. Fluids A 2, 160166.Google Scholar
Ungarish, M. 1991 Spin-up from rest of a light-particle suspension in a cylinder: Theory and observations. Intl. J. Multiphase flow 17, 131143.Google Scholar
Ungarish, M. 1993 Hydrodynamics of Suspensions: Fundamentals of Centrifugal and Gravity Separation. Springer.