Two types of quasi-periodic Hopf bifurcations are known, in which a Whitney smooth family of quasi-periodic attractors loses its hyperbolicity. One is the reducible case, where the normal linear dynamics are trivial. Another is the skew case, where the normal dynamics are topologically non-trivial. There, the dynamics can involve periodicity, quasi-periodicity and chaos, including chaos with a mixed spectrum. This paper investigates a model system where the bifurcating circle supports Morse-Smale (also called resonant) dynamics. First this is done under the assumption of rotational symmetry (in the normal direction) of the system; a local bifurcation analysis is given for this. Then the effects of generic (non-symmetric) perturbations are d...
A model map Q for the Hopf-saddle-node (HSN) bifurcation of fixed points of diffeomorphisms is studi...
Dynamical phenomena are studied near a Hopf-saddle-node bifurcation of fixed points of 3D-diffeomorp...
This paper focuses on the parametric abundance and the 'Cantorial' persistence under perturbations o...
Two types of quasi-periodic Hopf bifurcations are known, in which a Whitney smooth family of quasi-p...
In the skew Hopf bifurcation a quasi-periodic attractor with nontrivial normal linear dynamics loses...
In the skew Hopf bifurcation a quasi-periodic attractor with nontrivial normal linear dynamics loses...
In the skew Hopf bifurcation a quasi-periodic attractor with nontrivial normal linear dynamics loses...
This paper provides an overview of the universal study of families of dynamical systems undergoing a...
The dynamics near a Hopf saddle-node bifurcation of fixed points of diffeomorphisms is analysed by m...
We consider the perturbed quasi-periodic dynamics of a family of reversible systems with normally 1:...
This paper first summarizes the theory of quasi-periodic bifurcations for dissipative dynamical syst...
We consider the perturbed quasi-periodic dynamics of a family of reversible systems with normally 1:...
Abstract. A generalised Hopf bifurcation, corresponding to non-semisimple double imapi-nary eigenval...
The dynamics near a Hopf saddle-node bifurcation of fixed points of diffeomorphisms is analysed by m...
This paper deals with families of planar diffeomorphisms undergoing a Hopf–Neĭmarck–Sacker bifurcati...
A model map Q for the Hopf-saddle-node (HSN) bifurcation of fixed points of diffeomorphisms is studi...
Dynamical phenomena are studied near a Hopf-saddle-node bifurcation of fixed points of 3D-diffeomorp...
This paper focuses on the parametric abundance and the 'Cantorial' persistence under perturbations o...
Two types of quasi-periodic Hopf bifurcations are known, in which a Whitney smooth family of quasi-p...
In the skew Hopf bifurcation a quasi-periodic attractor with nontrivial normal linear dynamics loses...
In the skew Hopf bifurcation a quasi-periodic attractor with nontrivial normal linear dynamics loses...
In the skew Hopf bifurcation a quasi-periodic attractor with nontrivial normal linear dynamics loses...
This paper provides an overview of the universal study of families of dynamical systems undergoing a...
The dynamics near a Hopf saddle-node bifurcation of fixed points of diffeomorphisms is analysed by m...
We consider the perturbed quasi-periodic dynamics of a family of reversible systems with normally 1:...
This paper first summarizes the theory of quasi-periodic bifurcations for dissipative dynamical syst...
We consider the perturbed quasi-periodic dynamics of a family of reversible systems with normally 1:...
Abstract. A generalised Hopf bifurcation, corresponding to non-semisimple double imapi-nary eigenval...
The dynamics near a Hopf saddle-node bifurcation of fixed points of diffeomorphisms is analysed by m...
This paper deals with families of planar diffeomorphisms undergoing a Hopf–Neĭmarck–Sacker bifurcati...
A model map Q for the Hopf-saddle-node (HSN) bifurcation of fixed points of diffeomorphisms is studi...
Dynamical phenomena are studied near a Hopf-saddle-node bifurcation of fixed points of 3D-diffeomorp...
This paper focuses on the parametric abundance and the 'Cantorial' persistence under perturbations o...