- M. Stiefenhofer:
Singular Perturbation with Limit Points in the Fast Dynamics
-
A singular perturbation problem in ordinary differential equations is
investigated without assuming hyperbolicity of the associated slow
manifold. More precisely, the slow manifold consists of a branch of
stationary points or a branch of periodic orbits which lose their
hyperbolicity at a
limit point. Thus, in a neighbourhood of this point a reduction to the slow
manifold is not possible. This situation is examined within a generic one
parameter unfolding leading in case of a stationary or periodic limit point
to a curve of Hopf or Naimark-Sacker bifurcation points with associated
periodic orbits or invariant tori respectively. The stationary case is
examined in detail
with the aim of characterizing the domain in parameter space yielding periodic
orbits as precisely as possible. Moreover, the shape and stability of the
periodic orbits is determined. The paper examines one case of a not finite
determined Bogdanov point with properties partly motivated by formal results
in Baer, Erneux (1986).
preprint_61_96.ps (12MB (!), includes 8 illustrations)
DFG-Projekt Verbindungsorbits (Bielefeld)
DFG-Schwerpunktprogramm Dynamik (Berlin)
Thorsten Göke, erstellt am 17.02.98
Fakultät für Mathematik |
Universität Bielefeld