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Slowly-varying bifurcation theory in dissipative systems

Published online by Cambridge University Press:  17 February 2009

J. P. Denier  and
R. Grimshaw
R. Grimshaw
Affiliation:
School of Mathematics, The University of New South Wales, Kensington, NSW, 2033, Australia.
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Abstract

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Systems of coupled nonlinear differential equations with an externally controlled slowly-varying bifurcation parameter are considered. Canonical equations governing the transition between bifurcated solutions are derived by making use of methods of “steady” bifurcation theory. It is found that, depending on the initial amplitudes, the solutions of the transition equations are either asymptotically equivalent to the bifurcated solutions or the solutions develop algebraic singularities at some positive finite time. These singularities correspond to a transition to a solution of a fully nonlinear problem.

Type
Research Article
Information
The ANZIAM Journal , Volume 31 , Issue 3 , January 1990 , pp. 301 - 318
Copyright
Copyright © Australian Mathematical Society 1990

References

[1] Abramowitz, M. and Stegun, I. A., Handbook of mathematical functions (Washington: National Bureau of Standards, 1965).Google Scholar
[2] Erneux, T. and Mandel, P., “Imperfect bifurcation with a slowly-varying control parameter”, SIAM J. Appl. Math. 46 (1986) 115.CrossRefGoogle Scholar
[3] Guckenheimer, J. and Holmes, P., Nonlinear oscillations, dynamical systems, and bifurcations of vector fields (Springer-Verlag, New York, 1983).Google Scholar
[4] Hauberman, R., “Slowly varying jump and transition phenomena associated with algebraic bifurcation problems”, SIAM J. Appl. Maths. 37 (1979) 69106.Google Scholar
[5] Hall, P., “On the nonlinear stability of slowly varying time-dependent viscous flows”, J. Fluid Mech. 126 (1983) 357368.CrossRefGoogle Scholar
[6] Iooss, G. and Joseph, D. D., Elementary stability and bifurcation theory (Springer-Verlag, New York, 1980).CrossRefGoogle Scholar
[7] Kapila, A. K., “Arrhenius systems: dynamics of jump due to the slow passage through criticalit”, SIAM J. Appl. Math.. 41 (1981) 2942.Google Scholar
[8] Lebovitz, N. R. and Schaar, R. J., “Exchange of stabilities in autonomous systems”, Stud. Appl. Maths. 54 (1975) 229260.Google Scholar
[9] Lebovitz, N. R. and Schaar, R. J., “Exchange of stabilities in autonomous systems-II. Vertical bifurcation”, Stud. Appl. Maths. 56 (1977) 150.CrossRefGoogle Scholar
[10] Rubenfeld, L. A., “A Model bifurcation problem exhibiting the effects of slow passage through critical”, SIAM J. Appl. Math. 37 (1979) 302306.CrossRefGoogle Scholar
[11] Schecter, S., “Persistent unstable equilibria and closed orbits of a singularly perturbed equation”, J. Diff. Equations 60 (1985) 131141.CrossRefGoogle Scholar