Many techniques have been developed for the measure of the largest Lyapunov exponent of experimental short data series. The main idea, underlying the most common algorithms, is to mimic the method of computation proposed by Benettin and Galgani [1979]. The aim of the present paper is to provide an explanation for the reliability of some algorithms developed for short time series. To this end, we consider two-dimensional mappings as model problems and we compare the results obtained using the Benettin and Galgani method to those obtained using some algorithms for the computation of the largest Lyapunov exponent when dealing with short data series. In particular we focus our attention on conservative systems, which are not widely investigated...
We propose a method that allows us to analytically compute the largest Lyapunov exponent of a Hamilt...
ABSTRACT: This paper discusses the Lyapunov exponents as a quantifier of chaos with two dimensional ...
Lyaponov exponents are a generalization of the eigenvalues of a dynamical system at an equilibrium p...
Many techniques have been developed for the measure of the largest Lyapunov exponent of experimental...
International audienceMany techniques have been developed for the measure of the largest Lyapunov ex...
summary:The Lyapunov exponents (LE) provide a simple numerical measure of the sensitive dependence o...
Lyapunov exponents are important statistics for quantifying stability and deterministic chaos in dyn...
For want of a nail the shoe was lost. For want of a shoe the horse was lost. For want of a horse the...
In this article, we consider chaotic behavior happened in nonsmooth dynamical systems. To quantify s...
We discuss abilities of quantifying low-dimensional chaotic oscillations at the input of two thresho...
The Lyapunov exponents serve as numerical characteristics of dynamical systems, which measure possib...
Detecting the presence of chaos in a dynamical system is an important problem that is solved by meas...
Lyapunov exponents lie at the heart of chaos theory, and are widely used in studies of complex dynam...
In the present thesis two main results are presented. The first is a study of the statistical proper...
The kind support of the Czech Science Foundation project No. 17-26353J and of the RVO 68378297 insti...
We propose a method that allows us to analytically compute the largest Lyapunov exponent of a Hamilt...
ABSTRACT: This paper discusses the Lyapunov exponents as a quantifier of chaos with two dimensional ...
Lyaponov exponents are a generalization of the eigenvalues of a dynamical system at an equilibrium p...
Many techniques have been developed for the measure of the largest Lyapunov exponent of experimental...
International audienceMany techniques have been developed for the measure of the largest Lyapunov ex...
summary:The Lyapunov exponents (LE) provide a simple numerical measure of the sensitive dependence o...
Lyapunov exponents are important statistics for quantifying stability and deterministic chaos in dyn...
For want of a nail the shoe was lost. For want of a shoe the horse was lost. For want of a horse the...
In this article, we consider chaotic behavior happened in nonsmooth dynamical systems. To quantify s...
We discuss abilities of quantifying low-dimensional chaotic oscillations at the input of two thresho...
The Lyapunov exponents serve as numerical characteristics of dynamical systems, which measure possib...
Detecting the presence of chaos in a dynamical system is an important problem that is solved by meas...
Lyapunov exponents lie at the heart of chaos theory, and are widely used in studies of complex dynam...
In the present thesis two main results are presented. The first is a study of the statistical proper...
The kind support of the Czech Science Foundation project No. 17-26353J and of the RVO 68378297 insti...
We propose a method that allows us to analytically compute the largest Lyapunov exponent of a Hamilt...
ABSTRACT: This paper discusses the Lyapunov exponents as a quantifier of chaos with two dimensional ...
Lyaponov exponents are a generalization of the eigenvalues of a dynamical system at an equilibrium p...