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The deformation of a viscous particle surrounded by an elastic shell in a general time-dependent linear flow field

Published online by Cambridge University Press:  20 April 2006

P. O. Brunn
Affiliation:
Department of Chemical Engineering and Applied Chemistry, Columbia University, New York

Abstract

The dynamics of a viscous particle surrounded by an elastic shell of arbitrary thickness freely suspended in a general linear flow field is investigated. Assuming the unstressed shell to be spherical, an analysis is presented for the case in which the flow-induced deformation leads to small departures from sphericity. The general time-dependent evolution of shape is derived and various special cases (purely elastic sphere, rigid and gaseous interior, elastic membranes) are discussed in detail. It is found that for steady-state flows the equilibrium deformations are absolutely stable and depend only upon the shell thickness, although the rates at which they are attained show the effect of the inside viscosity, too.

Type
Research Article
Copyright
© 1983 Cambridge University Press

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References

BARTHèS-BIESEL, D. 1980 Motion of a spherical microcapsule freely suspended in a linear shear flow J. Fluid Mech. 100, 831858.Google Scholar
BARTHèS-BIESEL, D. & Rallison, J. M. 1981 The time-dependent deformation of a capsule freely suspended in a linear shear flow J. Fluid Mech. 113, 251267.Google Scholar
Brunn, P. O. 1980 On the rheology of viscous drops surrounded by an elastic shell Biorheol. 17, 419430.Google Scholar
Cox, R. G. 1969 The deformation of a drop in a general time-dependent fluid flow J. Fluid Mech. 37, 601623.Google Scholar
Goddard, J. D. & Miller, C. 1967 Nonlinear effects in the rheology of dilute suspensions J. Fluid Mech. 28, 657673.Google Scholar
Guerlet, B., BARTHèS-BIESEL, D. & Stoltz, J. F. 1977 Deformation of a sphered red blood cell freely suspended in a simple shear flow INSERIM 71, 257264.Google Scholar
FRöHLICH, H. & Sack, R. 1946 Theory of the rheological properties of dispersions. Proc. R. Soc. Lond A 185, 415430.Google Scholar
Roscoe, R. 1967 On the rheology of viscoelastic spheres in a viscous fluid J. Fluid Mech. 28, 273293.Google Scholar