This work comprises a general study of symmetry breaking for compact Lie groups in the context of equivariant bifurcation theory. The author starts by extending the theory developed by Field and Richardson for absolutely irreducible representations of finite groups to general irreducible representations of compact Lie groups. In particular, the author allows for branches of relative equilibria and phenomena such as the Hopf bifurcation. The author also presents a general theory of determinacy for irreducible Lie group actions along the lines previously described by Field in Equivariant Bifurcation Theory and Symmetry Breaking. In the main result of this work, it is shown that branching patterns for generic equivariant bifurcation problems defined on irreducible representations persist under perturbations by sufficiently high order non-equivariant terms. The author gives applications of this result to normal form computations yielding, for example, equivariant Hopf bifurcations and shows how normal form computations of branching and stabilities are valid when taking account of the non-normalized tail.
In the context of equivariant bifurcation theory, extends the theory developed for absolutely irreducible representations of finite groups to general irreducible representations of compact Lie groups. Allows for branches of relative equilibria and phenomena, presents a general theory of determinacy for irreducible Lie group actions, and demonstrates that branching patterns for generic equivariant bifurcation problems defined on irreducible representations persist under perturbations by sufficiently high-order, non-equivariant terms. No index. Member prices are $26 for members and $34 for institutions. Annotation c. Book News, Inc., Portland, OR (booknews.com)
