Stretching of viscous threads at low Reynolds numbers
Document Type
Article
Publication Date
9-25-2011
Abstract
We investigate the classical problem of the extension of an axisymmetric viscous thread by a fixed applied force with small initial inertia and small initial surface tension forces. We show that inertia is fundamental in controlling the dynamics of the stretching process. Under a long-wavelength approximation, we derive leading-order asymptotic expressions for the solution of the full initial-boundary value problem for arbitrary initial shape. If inertia is completely neglected, the total extension of the thread tends to infinity as the time of pinching is approached. On the other hand, the solution exhibits pinching with finite extension for any non-zero Reynolds number. The solution also has the property that inertia eventually must become important, and pinching must occur at the pulled end. In particular, pinching cannot occur in the interior as can happen when inertia is neglected. Moreover, we derive an asymptotic expression for the extension. © Cambridge University Press 2011.
Identifier
80053169165 (Scopus)
Publication Title
Journal of Fluid Mechanics
External Full Text Location
https://doi.org/10.1017/jfm.2011.259
e-ISSN
14697645
ISSN
00221120
First Page
212
Last Page
234
Volume
683
Grant
102909
Fund Ref
National Science Foundation
Recommended Citation
Wylie, Jonathan J.; Huang, Huaxiong; and Miura, Robert M., "Stretching of viscous threads at low Reynolds numbers" (2011). Faculty Publications. 11168.
https://digitalcommons.njit.edu/fac_pubs/11168
