Add to ORKGThere are many examples of complicated or chaotic dynamics, but the set of examples for which chaos has been rigorously demonstrated is quite small. In most cases where chaotic dynamics has been proven, the strategy has involved analysing a simple singular map or integrable problem and then perturbing th
The dynamics and limit set of a discrete-time system is described which is similar to the horseshoe ...
The dynamics and limit set of a discrete-time system is described which is similar to the horseshoe ...
PREFACE FOREWORD The Stability of One-Dimensional Maps Introduction Maps vs. Difference Equa...
Using phase–plane analysis, findings from the theory of topological horseshoes and linked-twist maps...
Abstract. In this paper we present the proof of the existence of symbolic topological results based ...
We investigate the presence of complex behaviors for the solutions of two different dynamical system...
There are many types of dynamical system for which quite simple topological hy potheses imply very c...
We study fixed point theorems for maps which satisfy a property of stretching a suitably oriented to...
We study fixed point theorems for maps which satisfy a property of stretching a suitably oriented to...
We study fixed point theorems for maps which satisfy a property of stretching a suitably oriented to...
We study fixed point theorems for maps which satisfy a property of stretching a suitably oriented to...
The iterations of real maps represent one of the easiest models of dynami-cal systems, but, despite ...
The behaviour and properties of one-dimensional discrete mappings are explored by writing Matlab cod...
There exist (2n + 1)-fold horseshoes with topological entropy ln(2n + 1) for n ≥ 1 in the standard m...
In this paper, a new one-dimensional map is introduced, which exhibits chaotic behavior in small int...
The dynamics and limit set of a discrete-time system is described which is similar to the horseshoe ...
The dynamics and limit set of a discrete-time system is described which is similar to the horseshoe ...
PREFACE FOREWORD The Stability of One-Dimensional Maps Introduction Maps vs. Difference Equa...
Using phase–plane analysis, findings from the theory of topological horseshoes and linked-twist maps...
Abstract. In this paper we present the proof of the existence of symbolic topological results based ...
We investigate the presence of complex behaviors for the solutions of two different dynamical system...
There are many types of dynamical system for which quite simple topological hy potheses imply very c...
We study fixed point theorems for maps which satisfy a property of stretching a suitably oriented to...
We study fixed point theorems for maps which satisfy a property of stretching a suitably oriented to...
We study fixed point theorems for maps which satisfy a property of stretching a suitably oriented to...
We study fixed point theorems for maps which satisfy a property of stretching a suitably oriented to...
The iterations of real maps represent one of the easiest models of dynami-cal systems, but, despite ...
The behaviour and properties of one-dimensional discrete mappings are explored by writing Matlab cod...
There exist (2n + 1)-fold horseshoes with topological entropy ln(2n + 1) for n ≥ 1 in the standard m...
In this paper, a new one-dimensional map is introduced, which exhibits chaotic behavior in small int...
The dynamics and limit set of a discrete-time system is described which is similar to the horseshoe ...
The dynamics and limit set of a discrete-time system is described which is similar to the horseshoe ...
PREFACE FOREWORD The Stability of One-Dimensional Maps Introduction Maps vs. Difference Equa...