P. Chossat, M. Golubitsky and B. Keyfitz
Hopf-Hopf mode interactions with 0(2) symmetry
Dyn. Stab. Sys. 1, No. 4 (1986) 255-292.
In this paper we study the unfoldings of 0(2)-equivariant vector fields
whose linearization has two pairs of purely imaginary eigenvalues. Such
singularities may be expected to occur at isolated points in a center
manifold reduction of two parameter systems with full circular symmetry.
This situation differs from the corresponding non-symmetric system in that generically the eigenvalues may be either simple or double. The case
when both eigenvalues are simple is similar to the Takens codimension-two
singularity. Our interest lies in the cases where one or both of the
purely imaginary eigenvalues are double; these cases lead to 6- and
8-dimensional center manifolds, respectively. We use isotropy subgroup
techniques to classify the types of solutions which occur. These
include periodic solutions and 2-,3-, and 4-dimensional invariant tori.