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Stability of Normal Modes and Subharmonic Bifurcations in the 3-Body Stokeslet Problem

โœ Scribed by C.C. Lim; I.H. Mccomb

Publisher
Elsevier Science
Year
1995
Tongue
English
Weight
685 KB
Volume
121
Category
Article
ISSN
0022-0396

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โœฆ Synopsis

The authors show that the isoseeles synchronous periodic solutions of the 3-body Stokeslet problem are elliptic near the equilibrium. A calculation going beyond group-theoretic considerations is given to decide the stability of the isosceles synchronous and the instability of the isosceles asynchronous normal modes. Moreover, it is shown that subharmonic solutions bifurcate from these elliptic modes at a dense set of parameter values near the equilibrium. Together with the lincar stability of the equilibrium, the ellipticity and subharmonic bifurcations of the isosceles synchronous normal modes justify theoretically the robustness of small clusters of sedimenting spheres that were observed experimentally as well as in

computational studies. if 1995 Academic Press. Inc

๐Ÿ“œ SIMILAR VOLUMES

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โœ Carl D. Murray ๐Ÿ“‚ Article ๐Ÿ“… 1994 ๐Ÿ› Elsevier Science ๐ŸŒ English โš– 989 KB

The location and stability of the five Lagrangian equilibrium points in the planar, circular restricted three-body problem are investigated when the third body is acted on by a variety of drag forces. The approximate locations of the displaced equilibrium points are calculated for small mass ratios