Singularity Theory and Equivariant Symplectic Maps
by Thomas J Bridges and Jacques E Furter
Appendices
- [A.] Equivariant Splitting Lemma
- [B.] Signature on configuration space
- [C.] Linear stability on configuration space
- [D.] Transformation to linear normal form
- [E.] Symmetries and conservation laws
- [F.] About reversible symplectic maps
- [G.] Twist maps and dynamical equivalence
- [H.] Z_q-equivariant bifurcation equations and linear stability
- [I.] About symmetric symplectic operators
- [J.] (p,q)-resonances for symplectic maps
- [K.] About reversible equivariant symplectic maps
- [L.] Bifurcations and critical points of equivariant functionals
- [M.] Instability Lemma
- [N.] Isotropy and twisted subgroups of \Sigma\times\Zq