Breaking of symmetry in the saddle-node Hopf bifurcation

case, the degeneracy is dealt with by splitting the vector field into two parts, one tangent to the group orbit and the other In problems with O(2) symmetry, the Jacobian matrix at nontrivial steady state solutions with D n symmetry always has a zero eigen-normal to it. A standard bifurcation analy

The birth of C k -smooth invariant curves from a saddle-node bifurcation in a family of C k diffeomorphisms on a Banach manifold (possibly infinite dimensional) is constructed in the case that the fixed point is a stable node along hyperbolic directions, and has a smooth noncritical curve of homocli

We investigate the global equilibria of the uplifted heavy elastic strip. We show that after nondimensionalization the problem is parameter-free and find stable and physically observable configurations which break the reflection symmetry of the initial shapes. We derive the Hamiltonian for this syst

The Hopf bifurcation with D h T 2 symmetry generically has open regions of the normal form coefficient space where 4 w x all branches of periodic solutions bifurcate supercritically but none is stable 1 . In such regions we prove the existence of an attracting set near the origin. A new possibility