The connection of these maps to homoclinic loops acts like an amplifier of the map behavior, and makes it interesting also in the case where all map orbits approach zero (but in many possible ways). We introduce so-called ‘flat’ intervals containing exactly one maximum or minimum, and so-called ‘steep’ intervals containing exactly one zero point of fµ,ω and no zero of f 0 µ,ω. For specific parameters µ and ω, we construct an open set of points with orbits staying entirely in the ‘flat’ intervals in section three. In section four, we describe orbits staying in the ‘steep’ intervals (for open parameter sets), and in section five (for specific parameters) orbits regularly changing between ‘steep’ and ‘flat’ intervals. Both orbit types are desc...
Abstract Homoclinic orbits and heteroclinic connections are important in several contexts, in partic...
We consider a family of strongly-asymmetric unimodal maps \{f_t\}_{t\in [0,1]} of the form f_t=t\cdo...
Zou YK, Beyn W-J. On manifolds of connecting orbits in discretizations of dynamical systems. Nonline...
We investigate the dynamics of the maps fµ,w (x) := xµ sin(w ln(x)) with µ > 1 (and odd continuation...
This dissertation is a study of the dynamics of one-dimensional unimodal maps and is mainly concerne...
For a continuous map on the unit interval or circle, we define the bifurcation set to be the collect...
We study bifurcations of a homoclinic tangency to a saddle fixed point without non-leading multiplie...
For a continuous map on the unit interval or circle, we define the bifurcation set to be the collect...
We introduce a renormalization model which explains how the behavior of a discrete-time continuous d...
For a continuous map on the unit interval or circle, we define the bifurcation set to be the collect...
We describe new methods for initializing the computation of homoclinic orbits for maps in a state sp...
We describe new methods for initializing the computation of homoclinic orbits for maps in a state sp...
For a continuous map on the unit interval or circle, we define the bifurcation set to be the collect...
We consider a family of strongly-asymmetric unimodal maps {ft}t∈[0,1] of the form ft=t⋅f where f:[0,...
We construct an open class of 2-parameter families of 1-dimensional maps for which, in some measure ...
Abstract Homoclinic orbits and heteroclinic connections are important in several contexts, in partic...
We consider a family of strongly-asymmetric unimodal maps \{f_t\}_{t\in [0,1]} of the form f_t=t\cdo...
Zou YK, Beyn W-J. On manifolds of connecting orbits in discretizations of dynamical systems. Nonline...
We investigate the dynamics of the maps fµ,w (x) := xµ sin(w ln(x)) with µ > 1 (and odd continuation...
This dissertation is a study of the dynamics of one-dimensional unimodal maps and is mainly concerne...
For a continuous map on the unit interval or circle, we define the bifurcation set to be the collect...
We study bifurcations of a homoclinic tangency to a saddle fixed point without non-leading multiplie...
For a continuous map on the unit interval or circle, we define the bifurcation set to be the collect...
We introduce a renormalization model which explains how the behavior of a discrete-time continuous d...
For a continuous map on the unit interval or circle, we define the bifurcation set to be the collect...
We describe new methods for initializing the computation of homoclinic orbits for maps in a state sp...
We describe new methods for initializing the computation of homoclinic orbits for maps in a state sp...
For a continuous map on the unit interval or circle, we define the bifurcation set to be the collect...
We consider a family of strongly-asymmetric unimodal maps {ft}t∈[0,1] of the form ft=t⋅f where f:[0,...
We construct an open class of 2-parameter families of 1-dimensional maps for which, in some measure ...
Abstract Homoclinic orbits and heteroclinic connections are important in several contexts, in partic...
We consider a family of strongly-asymmetric unimodal maps \{f_t\}_{t\in [0,1]} of the form f_t=t\cdo...
Zou YK, Beyn W-J. On manifolds of connecting orbits in discretizations of dynamical systems. Nonline...
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