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Klíč, Alois
Bifurcations of the periodic solutions in symmetric systems. (English). Aplikace matematiky, vol. 31 (1986), issue 1, pp. 27-40
MSC: 34C25, 58F14, 58F22 | MR 0836800 | Zbl 0596.34024 | DOI: 10.21136/AM.1986.104182
Keywords:
first order differential equation; delta-symmetric solution; periodic doubling bifurcations; symmetry-breaking bifurcations
Summary:
Bifurcation phenomena in systems of ordinary differential equations which are invariant with respect to involutive diffeomorphisms, are studied. Teh "symmetry-breaking" bifurcation is investigated in detail.
References:
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[2] W. M. Boothby: An Introduction to Difterentiable Manifolds and Riemannian Geometry. New York, Academic Press, 1975. MR 0426007
[3] A. Klíč: Period doubling bifurcations in a two-box model of the Brusselator. Aplikace matematiky 5, sv. 28, 1983, 335-343. MR 0712910
[4] J. W. Swift K. Wiesenfeld: Suppression of Period Doubling in Symmetric Systems. (unpublished).
[5] J. W. Swift K. Wiesenfeld: Suppression of Period Doubling in Symmetric Systems. Physical Review Letters, Vol. 52, No 9, 1984, 705-708. DOI 10.1103/PhysRevLett.52.705 | MR 0734140
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[7] J. E. Marsden M. McCrocken: The Hopf Bifurcation and Its Applications. New York, Springer-Verlag, 1976. MR 0494309
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