Abstract:
Systems of ordinary differential equations having a finite symmetry group are considered. One-parameter local bifurcations of symmetric equilibria corresponding to a double pair of purely imaginary eigenvalues are studied.
It is shown that in one case a two-dimensional torus is generated from the equilibrium. The torus contains limit cycles; their number does not depend on the values of the parameter. The trajectories of the system that do not leave a certain fixed domain may only tend to the equilibrium under study or to the 2-dimensional torus or to one of two (disjoint) limit cycles.
In all the other cases an invariant surface is generated from the equilibrium which is diffeomorphic to the three-dimensional sphere. The behaviour of the trajectories on this surface depends on the symmetry group and is not studied in this paper.
In the appendix we provide information on codimension 1 bifurcations corresponding to double zero eigenvalues.
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