Abstract
One-parameter bifurcations of periodic solutions of differential equations in ℝn with a finite symmetry group Γ are studied. The following three types of periodic solutions x(t) with the symmetry group H \(\subseteq \) Γ are considered separately.
• F-cycles: H consists of transformations that do not change the periodic solution, h(x(t)) ≡ x(t);
• S-cycles: H consists of transformations that shift the phase of the solution,
• FS-cycles: H consists of transformations of both F and S types. In the present paper bifurcations of F-cycles at double real multipliers and all codimension one bifurcations of S-cycles were studied. In the present paper a more complicated case of a double pair of complex multipliers for F-cycles is considered and bifurcations of FS-cycles are shortly discussed.
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References
E.V. Nikolaev and E.E. Shnol, Bifurcations of cycles in systems of differential equations with a finite symmetry group. I.. J. Dynam. and Control Syst. 4 (1998), No. 3, 315–341.
V.I. Arnold, Geometrical methods in the theory of ordinary differential equations. In: A Series of Comprehensive Studies in Math., Vol. 250. Springer, New York, 1983.
J. Guckenheimer and Ph. Holmes, Nonlinear oscillations, dynamical systems and bifurcations of vector fields. Appl. Math. Sci. 42 (1986).
V.S. Afraimovich, V.I. Arnold, Yu, S. Il'yashenko, and L.P. Shilnikov, Bifurcation theory. In: Dynamical Systems-5, Encyclopaedia of Mathematical Sciences, V.I. Arnold, Ed., Springer, Berlin, 1994.
Yu.A. Kuznetsov, Elements of Applied Bifurcation Theory. Appl. Math. Sci. 112 (1995).
M. Golubitsky, I. Stewart, and D.G. Schaeffer, Singularities and groups in bifurcation theory. II. Appl. Math. Sci. 69 (1988).
B. Werner, Eigenvalue problems with the symmetry of a group and bifurcations. In: Continuation and Bifurcations: Numerical Techniques and Applications, D. Roose, B. De Dier, and A. Spence, Eds. NATO ASI Series, Series C: Mathematical and Physical Sciences, Vol. 313. Kluwer Academic Publishers, 1990, 71–88.
D. Ruelle, Bifurcations in the presence of a symmetry group. Arch. Rational Mech. Anal. 51 (1973), 136–152.
E. E. Shnol and E. V. Nikolaev, Bifurcations of equilibria in systems of differential equations with a finite symmetry group. (Russian) Preprint: Institute for Mathematical Problems in Biology, Academy of Sciences of Russian Federation (Pushchino), 1997.
P. Chossat and M. Golubitsky, Iterates of maps with symmetry. SIAM J. Math. Anal. 19 (1988), No. 6, 1259–1270.
M. W. Hirsch, C. C. Pugh, and M. Shub, Invariant manifolds. Springer, Berlin, 1977.
Yu.A. Kuznetsov, Andronov-Hopf bifurcation in a four-dimensional system with the circular symmetry. (Russian) Preprint: Research Computing Centre, USSR Academy of Sciences (Pushchino), 1984.
B. Fiedler, Global bifurcation of periodic solutions with symmetry. Lect. Notes Math. 1309 (1988).
E.V. Nikolaev, Bifurcations of limit cycles of differential equations possessing a finite symmetry group. (Russian) PhD Thesis: Nizhegorod State University, Nizhnii Novgorod, 1995.
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Nikolaev, E.V., Shnol, E.E. Bifurcations of Cycles in Systems of Differential Equations with a Finite Symmetry Group – II. Journal of Dynamical and Control Systems 4, 343–363 (1998). https://doi.org/10.1023/A:1022884316030
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DOI: https://doi.org/10.1023/A:1022884316030