Title of article
On self-propulsion of micro-machines at low Reynolds number: Purcells three-link swimmer
Author/Authors
Stone، H. A. نويسنده , , BECKER، L. E. نويسنده , , KOEHLER، S. A. نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2003
Pages
-14
From page
15
To page
0
Abstract
Using slender-body hydrodynamics in the inertialess limit, we examine the motion of Purcellʹs swimmer, a planar, fore–aftsymmetric three-link flagellum or propulsive mechanism that translates by alternately moving its front and rear segments. Purcell (1976) concluded via symmetry arguments that the net displacement of such a swimmer must follow a straight line, but the direction and other details of the motion have never been investigated. Numerical results indicate that the direction of net translation and the speed of Purcellʹs swimmer depend on the angular amplitude of the swimming strokes as well as on the relative length of the links. Analytical results are presented for small rotations about the straightened configuration, and physical arguments are given to qualitatively explain the propulsive dynamics. The optimal swimmer configurations under the conditions of constant forcing and of minimum mechanical work are determined. We use a definition of efficiency based on the straightened configuration as a reference state to compare Purcellʹs swimmer with the previously treated swimming motions of an undulating rod and a rotating helix. Finally, we demonstrate the importance of the anisotropy in the local hydrodynamic slender-body drag to swimming motions at low Reynolds number by showing that, in general, any inextensible swimmer in an otherwise quiescent fluid cannot alter its average position under conditions of locally isotropic drag.
Keywords
finite dam , compound Poisson input , long-run average cost , PM(lambda),(tau) policy
Journal title
Journal of Fluid Mechanics
Serial Year
2003
Journal title
Journal of Fluid Mechanics
Record number
79836
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