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Homoclinic saddle to saddle-focus transitions in 4D systems

Kalia, Manu (2017) Homoclinic saddle to saddle-focus transitions in 4D systems.

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Abstract:We analyze a saddle to saddle-focus transition on a 4-dimensional homoclinic center manifold where the stable/unstable leading eigenspace is 3-dimensional (called the 3DL bifurcation). The transition is different from the Belyakov bifurcation, where a pair of complex eigenvalues split into two distinct real eigenvalues. Here a pair of complex eigenvalues and a real eigenvalue cross each other transversally, giving rise to a 3-dimensional stable/unstable leading situation. The work is motivated by the observation of this transition in [Meijer and Coombes, 2014] for the tame case (negative saddle quantity). We use near-to-saddle Poincare maps to give a detailed picture of global and local bifurcations occurring close to the critical saddle and the homoclinic connection respectively, in both wild and tame cases. We obtain sets of codimension 1 and 2 bifurcations that asymptotically approach the 3DL bifurcation point which are different in structure than those obtained in the Belyakov case.
Item Type:Essay (Master)
Clients:
Unknown organization, Netherlands
Faculty:EEMCS: Electrical Engineering, Mathematics and Computer Science
Subject:31 mathematics
Programme:Applied Mathematics MSc (60348)
Link to this item:https://purl.utwente.nl/essays/72956
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