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Second order averaging and bifurcations to subharmonics in duffing's equation

โœ Scribed by C. Holmes; P. Holmes

Book ID
104154118
Publisher
Elsevier Science
Year
1981
Tongue
English
Weight
655 KB
Volume
78
Category
Article
ISSN
0022-460X

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โœฆ Synopsis

Periodic motions near an equilibrium solution of Duffing's equation with negative linear stiffness can evolve, lose their stability, and undergo period doubling bifurcations as excitation amplitude, frequency and damping are varied. For bifurcations to period two it is shown that these can be either sub-or supercritical, depending upon the excitation frequency. The analysis is carried out by the averaging method, and, to retain important non-linear effects, averaging must be taken to second order. Some remarks on higher order subharmonics are made.

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An algorithm tracing out the tangent bif
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โœ Hiroyuki Kitajima; Hiroshi Kawakami ๐Ÿ“‚ Article ๐Ÿ“… 1996 ๐Ÿ› John Wiley and Sons ๐ŸŒ English โš– 364 KB

The bifurcation diagram is constructed in the analysis of the bifurcation phenomenon. A problem in the conventional method of bifurcation diagram construction is that the computation is interrupted at the cusp point on the tangent bifurcation curve. Consequently, it has been necessary to determine t