Numerical evidence for the non-existence of solutions of the equations describing rotational fiber spinning
Technical Report, Berichte des Fraunhofer ITWM, Nr. 108, 2007
Authors
- T. Götz
- Axel Klar
- Andreas Unterreiter
- Raimund Wegener
Abstract
The stationary, isothermal rotational spinning process of fibers is considered. The investigations are concerned with the case of large Reynolds ($\delta=3/Re$) and small Rossby numbers ($\eps = Rb$). Modelling the fibers as a Newtonian fluid and applying slender body approximations, the process is described by a two--point boundary value problem of ODEs. The involved quantities are the coordinates of the fiber's centerline, the fluid velocity and viscous stress. The inviscid case $\delta=0$ is discussed as a reference case. For the viscous case $\delta\gr 0$ numerical simulations are carried out. Transfering some properties of the inviscid limit to the viscous case, analytical bounds for the initial viscous stress of the fiber are obtained. A good agreement with the numerical results is found. These bounds give strong evidence, that for $\delta > 3\eps^2$ no physical relevant solution can exist. A possible interpretation of the above coupling of $\delta$ and $\eps$ related to the die--swell phenomenon is given.
BibTeX
@TechReport{ Goetz.Klar.EA07numerical,
title = { Numerical evidence for the non-existence of solutions of the equations describing rotational fiber spinning },
author = { T. Götz and Axel Klar and Andreas Unterreiter and Raimund Wegener },
series = { Berichte des Fraunhofer ITWM, Nr. 108 },
year = 2007,
}
This publication belongs to the project
Fimod.
