Abstract
For differential equations with a compact symmetry group Г some results on global bifurcation of time periodic orbits are presented. In particular it is investigated how the spatial and temporal action of the group Г on a time periodic orbit may vary along global bifurcation branches, e.g. at period doubling bifurcations. The results are obtained geometrically by generic but equivariant approximation, rather than by topological techniques. As an application periodic solutions in reaction diffusion systems with symmetry Dn or O(3) are discussed.
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