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Rotation of a cylinder about an eccentric parallel axis in a viscous fluid

Published online by Cambridge University Press:  29 March 2006

Chang-Yi Wang
Affiliation:
Department of Mathematics, Michigan State University, East Lansing

Abstract

A circular cylinder in an infinite fluid rotates rigidly about a fixed axis which is parallel to, but does not coincide with, its geometric axis. It is found that, depending on the relative magnitude of the Reynolds number R and eccentricity ε, the flow may have two, one or no boundary layers. General solutions for R [Lt ] are obtained. It is found that owing to eccentricity there exist both a flow periodic in the circumferential direction and a non-periodic flow which is a function only of the radial distance from the centre of the cylinder. The non-periodic flow is caused by the nonlinear Reynolds stress and contributes to the torque experienced by the cylinder. The high Reynolds number case, \[ 1 \Lt R \Lt\epsilon^{-\frac{3}{2}}, \] is solved by matched asymptotic expansions. The stream function can be represented by Hankel functions of order 1/3 and a slight decrease in torque is found. In the low Reynolds number case, R [Lt ] 1, the torque is increased owing to eccentricity when R < 0·145 and decreased when R > 0·145. A physical explanation is presented.

Type
Research Article
Copyright
© 1972 Cambridge University Press

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References

Chang, W. 1948 Der Spannungszustand in Kreisringschale und ähnlichen Schalen mit Scheitelkreisringen unter drehsymmetrischer Belastung. Nat. Tsing Hwa Sc. Rep. no. A5, 289–349.Google Scholar
Harvard University Computation Laboratory 1954 Tables of the Modified Hankel Functions of order One-Third and of their Derivatives. Harvard University Press.
Jahnke, E. & Emde, F. 1945 Tables of Functions with Formulae and Curves, 4th edn. Dover.
Riley, N. 1971 Stirring of viscous fluid Z. Angew. Math. Phys. 22, 645653.Google Scholar
Tölke, F. 1936 Besselsche und Hankelsche Zylinderfunktionen. Stuttgart: Verlag von Konrad Wittwer.
Wang, C.-Y. 1969 Lateral vibrations of a rotating shaft in a viscous fluid J. Appl. Mech. 36, 682686.Google Scholar