Abstract
A saddle to saddle-focus homoclinic transition when the stable leading eigenspace is three-dimensional (called the 3DL bifurcation) is analyzed. Here a pair of complex eigenvalues and a real eigenvalue exchange their position relative to the imaginary axis, giving rise to a 3D stable leading eigenspace at the critical parameter values. This transition is different from the standard Belyakov bifurcation, where a double real eigenvalue splits either into a pair of complex-conjugate eigenvalues or two distinct real eigenvalues. In the wild case, we obtain sets of codimension 1 and 2 bifurcation curves and points that asymptotically approach the 3DL bifurcation point and have a structure that differs from that of the standard Belyakov case. We give an example of this bifurcation in a perturbed Lorenz-Stenflo 4D ordinary differential equation model.
Original language | English |
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Pages (from-to) | 2024-2054 |
Number of pages | 31 |
Journal | Nonlinearity |
Volume | 32 |
Issue number | 6 |
DOIs | |
Publication status | Published - 3 May 2019 |
Keywords
- homoclinic bifurcations
- numerical bifurcation analysis
- bifurcation theory