This paper exploits concepts derived from the thermodynamics of curves for the analysis and classification of dynamic systems. In particular, a new indicator based on an entropy measure is used to retrieve some information about the degree of irregularity of a curve. Irregularity is meant as a distance from the ordered situation of a sequence of points on a straight line. The proposed indicator is used to compare the evolution of trajectories in the state space for any dynamic system, and some of its properties are very interesting for the study and classification of nonlinear systems. Nowadays classification of nonlinear systems is still a tough subject, and there are not yet systematic approaches to tackle it. It would be useful h...
A possibility of a relation between the Kolmogorov-Sinai entropy of a dynamical system and the entro...
The identification of nonlinear dynamic systems can be rendered significantly more parsimonious if t...
In an attempt to quantify the dynamical complexity of power systems, we introduce the use of a non-l...
This paper provides a new approach for the analysis and eventually the classification of dynamical ...
In recent years, entropy has been used as a measure of the degree of chaos in dynamical systems. Thu...
publisher[Abstract] Nonlinear systems may exhibit chaos during evolution and at the state of chaos o...
This book deals with the various thermodynamic concepts used for the analysis of nonlinear dynamical...
Given ill-behaved psychological data that are unlikely to satisfy metric axioms, the use of encoding...
Ensemble of initial conditions for nonlinear maps can be described in terms of entropy. This ensembl...
A data-screening procedure for identifying the dynamic structure of psychological data series is pre...
This paper addresses the problem of measuring complexity from embedded attractors as a way to charac...
We study here a method for estimating the topological entropy of a smooth dynamical system. Our meth...
We analyze the principle of entropy increment for analysis of the stability of operation of technica...
The departure from equilibrium as the source of complex behaviour establishes a natural link between...
Abstract. Almost all natural systems have certain nonlinear properties and display ergodic and chaot...
A possibility of a relation between the Kolmogorov-Sinai entropy of a dynamical system and the entro...
The identification of nonlinear dynamic systems can be rendered significantly more parsimonious if t...
In an attempt to quantify the dynamical complexity of power systems, we introduce the use of a non-l...
This paper provides a new approach for the analysis and eventually the classification of dynamical ...
In recent years, entropy has been used as a measure of the degree of chaos in dynamical systems. Thu...
publisher[Abstract] Nonlinear systems may exhibit chaos during evolution and at the state of chaos o...
This book deals with the various thermodynamic concepts used for the analysis of nonlinear dynamical...
Given ill-behaved psychological data that are unlikely to satisfy metric axioms, the use of encoding...
Ensemble of initial conditions for nonlinear maps can be described in terms of entropy. This ensembl...
A data-screening procedure for identifying the dynamic structure of psychological data series is pre...
This paper addresses the problem of measuring complexity from embedded attractors as a way to charac...
We study here a method for estimating the topological entropy of a smooth dynamical system. Our meth...
We analyze the principle of entropy increment for analysis of the stability of operation of technica...
The departure from equilibrium as the source of complex behaviour establishes a natural link between...
Abstract. Almost all natural systems have certain nonlinear properties and display ergodic and chaot...
A possibility of a relation between the Kolmogorov-Sinai entropy of a dynamical system and the entro...
The identification of nonlinear dynamic systems can be rendered significantly more parsimonious if t...
In an attempt to quantify the dynamical complexity of power systems, we introduce the use of a non-l...