Global structure of homoclinic bifurcations: A combinatorial approach

We use the manifold approach to study the homoclinic bifurcations of a saddle fixed point in three-dimensional flows. With the introduction of time delay functions and symbolic rules on manifolds, we construct complete three-dimensional pictures of the invariant manifolds for the global flows.

Homoclinic cycles exist robustly in dynamical systems with symmetry, and may undergo various bifurcations, not all of which have an analog in the absence of symmetry. We analyze such a bifurcation, the transverse bifurcation; and uncover a variety of phenomena that can be distinguished representatio

In this work, bifurcations in the class that the homoclinic orbit connects the strong stable and strong unstable manifolds of a saddle are investigated for four-dimensional vector fields. The existence, numbers, coexistence and incoexistence of 1-homoclinic orbit, 1-periodic orbit, 2 n -homoclinic o