Hostname: page-component-78c5997874-8bhkd Total loading time: 0 Render date: 2024-11-05T11:24:29.263Z Has data issue: false hasContentIssue false
  • English
  • Français

Frictional–collisional equations of motion for participate flows and their application to chutes

Published online by Cambridge University Press:  26 April 2006

P. C. Johnson ,
P. Nott  and
R. Jackson
P. C. Johnson
Affiliation:
Department of Chemical Engineering, Princeton University, Princeton, NJ 08544, USA
P. Nott
Affiliation:
Department of Chemical Engineering, Princeton University, Princeton, NJ 08544, USA
R. Jackson
Affiliation:
Department of Chemical Engineering, Princeton University, Princeton, NJ 08544, USA
Get access Rights & Permissions [Opens in a new window]

Abstract

Measurements of the relation between mass hold-up and flow rate have been made for glass beads in fully developed flow down an inclined chute, over the whole range of inclinations for which such flows are possible. Velocity profiles in the flowing material have also been measured. For a given inclination it is found that two different flow regimes may exist for each value of the flow rate in a certain interval. One is an ‘energetic’ flow, and is produced when the particles are dropped into the chute from a height, while the other is relatively quiescent and occurs when entry to the chute is regulated by a gate. At some values of the inclination jumps in the flow pattern occur between these branches, and it is even possible for both branches to coexist in the same chute, separated by a shock. A theoretical treatment of chute flow has been based on a rheological model of the material which takes into account both collisional and fractional mechanisms for generating stress. Its predictions include most aspects of the observed behaviour, but quantitative comparison of theory and experiment is difficult because of the uncertain values of some parameters appearing in the theory.

Type
Research Article
Information
Journal of Fluid Mechanics , Volume 210 , January 1990 , pp. 501 - 535
Copyright
© 1990 Cambridge University Press

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

Augenstein, D. A. & Hogg, R. 1978 An experimental study of the flow of dry powders over inclined surfaces. Powder Technol. 19, 205215.Google Scholar
Brennen, C. E., Sieck, K. & Paslaski, J. 1983 Hydraulic jumps in granular material flow. Powder Technol. 35, 3137.Google Scholar
Campbell, C. S. 1982 Shear flows of granular materials. PhD thesis, California Institute of Technology.
Campbell, C. S., Brennen, C. E. & Sabersky, R. H. 1985 Flow regimes in inclined open-channel flow of granular materials. Powder Technol. 41, 7782.Google Scholar
Coulomb, C. A. 1776 Essai sur une application des regles de maximis et minimis a quelques problemes de statique, relatifs a l'architecture. Acad. R. Sci. Mem. Math. Phys. par Divers Savants 7, 343382.Google Scholar
Drucker, D. C. & Prager, W. 1952 Soil mechanics and plastic analysis or limit design. Q. Appl. Maths. 10, 157165.Google Scholar
Haff, P. K. 1983 Grain flow as a fluid-mechanical phenomenon. J. Fluid Mech. 134, 401430.Google Scholar
Hui, K., Haff, P. K., Ungar, J. E. & Jackson, R. 1984 Boundary conditions for high-shear grain flows. J. Fluid Mech. 145, 223233.Google Scholar
Hutter, K. & Sheiwiller, T. 1983 Rapid plane flow of granular materials down a chute. In Proc. US-Japan Seminar on New Models and Constitutive Relations in the Mechanics of Granular Materials (ed. J. T. Jenkins & M. Satake). Elsevier.
Ishida, M. & Shirai, T. 1979 Velocity distributions in the flow of solid particles in an inclined open channel. J. Chem. Engng Japan 12, 4550.Google Scholar
Jenkins, J. T. & Richman, M. W. 1985 Kinetic theory for plane flows of a dense gas of identical, rough, inelastic, circular disks. Phys. Fluids 28, 34853494.Google Scholar
Jenkins, J. T. & Richman, M. W. 1986 Boundary conditions for plane flows of smooth, nearly elastic, circular disks. J. Fluid Mech. 171, 5369.Google Scholar
Jenkins, J. T. & Savage, S. B. 1983 A theory for the rapid flow of identical, smooth, nearly elastic, spherical particles. J. Fluid Mech. 130, 187202.Google Scholar
Johnson, P. C. 1987 Frictional—collisional equations of motion for particulate flows with application to chutes and shear cells. Ph.D. thesis, Princeton University.
Johnson, P. C. & Jackson, R. 1987 Frictional-collisional constitutive relations for granular materials, with application to plane shearing. J. Fluid Mech. 176, 6793.Google Scholar
Jong, G. De J. De 1959 Statics and kinematics in the failable zone of granular material. Thesis, University of Delft.
Jong, G. De J. De 1977 Mathematical elaboration of the double-sliding free rotating model. Arch. Mech. 29, 561591.Google Scholar
Lun, C. K. K., Savage, S. B., Jeffrey, D. J. & Chepurniy, N. 1984 Kinetic theories for granular flow: inelastic particles in Couette flow and slightly inelastic particles in a general flow field. J. Fluid Mech. 140, 223256.Google Scholar
Mandel, J. 1947 Sur les lignes de glissement et le calcul des deplacements dans la deformation plastique. C.R.Hebd. Sceanc. Acad. Sci. Paris 225, 1272.Google Scholar
Patrose, B. & Caram, H. S. 1982 Optical fiber probe transit anemometer for particle velocity measurements in fluidized beds. AIChE J. 28, 604609.Google Scholar
Patton, J. S., Brennen, C. E. & Sabersky, R. H. 1987 Shear flows of rapidly flowing granular materials. Trans. ASME E: J. Appl. Mech. 54, 801805.Google Scholar
Reynolds, O. 1885 On the dilatancy of media composed of rigid particles in contact. Phil. Mag. 20, 469481.Google Scholar
Roscoe, K. H. 1970 The influence of strains in soil mechanics. Géotechnique 20, 129170.Google Scholar
Roscoe, K. H., Schofield, A. N. & Wroth, C. P. 1958 On the yielding of soils. Géotechnique 8, 2253.Google Scholar
Savage, S. B. 1978 Experiments on shear flows of cohesionless granular materials In Proc. US—Japan Seminar on Continuum-Mechanical and Statistical Approaches in the Mechanics of Granular Material, pp. 241254. Gakujutsu Bunken Fukyukai, Tokyo.
Savage, S. B. 1979 Gravity flow of cohesionless granular materials in chutes and channels. J. Fluid Mech. 92, 5396.Google Scholar
Savage, S. B. 1983 Granular flows down rough inclines - review and extension. In Proc. US—Japan Seminar on New Models and Constitutive Relations in the Mechanics of Granular Materials (ed. J. T. Jenkins & M. Satake). Elsevier.
Savage, S. B. & Jeffrey, D. J. 1981 The stress tensor in a granular flow at high shear rates. J. Fluid Mech. 110, 225272.Google Scholar
Savage, S. B. & Sayed, M. 1984 Stresses developed by dry cohesionless granular materials sheared in an annular shear cell. J. Fluid Mech. 142, 391430.Google Scholar
Scarlett, B. & Todd, A. C. 1969 The critical porosity of free flowing solids. Trans. ASME B: J. Engng Ind. 91, 477488.Google Scholar
Schofield, A. N. & Wroth, C. P. 1968 Critical State Soil Mechanics. McGraw-Hill.