Open AccessConstructing the Second Order Poincaré Map Based on the Hopf-Zero Unfolding Method
Author(s) -
Gen Ge,
Wei Wang
Publication year - 2013
Publication title -
abstract and applied analysis
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.228
H-Index - 56
eISSN - 1687-0409
pISSN - 1085-3375
DOI - 10.1155/2013/294162
Subject(s) - homoclinic orbit , mathematics , homoclinic bifurcation , orbit (dynamics) , heteroclinic orbit , saddle , zero (linguistics) , order (exchange) , mathematical analysis , singularity , poincaré map , bifurcation , physics , mathematical optimization , linguistics , philosophy , finance , quantum mechanics , nonlinear system , engineering , economics , aerospace engineering
We investigate the Shilnikov sense homoclinicity in a 3D system and consider the dynamical behaviors in vicinity of the principal homoclinic orbit emerging from a third order simplified system. It depends on the application of the simplest normal form theory and further evolution of the Hopf-zero singularity unfolding. For the Shilnikov sense homoclinic orbit, the complex form analytic expression is accomplished by using the power series of the manifolds surrounding the saddle-focus equilibrium. Then, the second order Poincaré map in a generally analytical style helps to portrait the double pulse dynamics existing in the tubular neighborhood of the principal homoclinic orbit
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