Bifurcations of a pair of singular cycles

In this paper we study the bifurcations of a pair of nonorientable heteroclinic cycles. In addition to the obvious and important bifurcation ''⍀-explosion,'' several other bifurcations, for example, homoclinic and heteroclinic bifurcation behaviors, are described in terms of symbolic sequences and s

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

This paper shows that asymmetrically perturbed, symmetric Hamiltonian systems of the form with analytic \* j (=)=O(=), have at most two limit cycles that bifurcate for small ={0 from any period annulus of the unperturbed system. This fact agrees with previous results of Petrov, Dangelmayr and Gucke

Time finite element analysis (TFEA) is used to determine the accuracy, stability, and limit cycle behavior of the milling process. Predictions are compared to traditional Euler simulation and experiments. The TFEA method forms an approximate solution by dividing the time in the cut into a finite num