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Viscoelastic potential flow analysis of capillary instability

T. Funadaa, D. D. Josephb,*

aDepartment of Digital Engineering, Numazu College of Technology, Ooka 3600, Numazu, Shizuoka, 410-8501 Japan
bDepartment Aerospace Engineering and Mechanics, University of Minnesota, 110 Union Street, 121 Akerman Hall, Minneapolis, MN 55455, USA

Received 24 July 2002; received in revised form 7 December 2002

Abstract

Analysis of the linear theory of capillary instability of threads of Maxwell fluids of diameter D is carried out for the unapproximated normal mode solution and for a solution based on viscoelastic potential flow. The analysis here extends the analysis of viscous potential flow [Int. J. Multiphase Flow 28 (2002) 1459] to viscoelastic fluids of Maxwell type. The analysis is framed in dimensionless variables with a velocity scale based on the natural collapse velocity  (surface tension/liquid viscosity). The collapse is controlled by two dimensionless parameters, a Reynolds number  where Oh is the Ohnesorge number, and a Deborah number  where  is the relaxation time. The density ratio  and  are nearly zero and do not have a significant effect on growth rates. The dispersion relation for viscoelastic potential flow is cubic in the growth rate  and it can be solved explicitly and computed without restrictions on the Deborah number. On the other hand, the iterative procedure used to solve the dispersion relation for fully viscoelastic flow fails to converge at very high Deborah number. The growth rates in both theories increase with Deborah number at each fixed Reynolds number, and all theories collapse to inviscid potential flow (IPF) for any fixed Deborah number as the Reynolds number tends to infinity.

© 2003 Elsevier Science B.V. All rights reserved.

Keywords: Instability; Capillary; Viscoelastic; Viscous; Inviscid; Oldroyd




* Corresponding author. Tel.: +1 612 626 8000; fax: +1 612 626 1558. E-mail address: joseph@aem.umn.edu (D.D. Joseph).