Add to ORKGThe robustness of the universality class concept of the chaotic transition was investigated by analytically obtaining its critical exponent for a wide class of maps. In particular, we extended the existing one-dimensional chaotic maps, thereby generalising the invariant density function from the Cauchy distribution by adding one parameter. This generalisation enables the adjustment of the power exponents of the density function and superdiffusive behavior. We proved that these generalised one-dimensional chaotic maps are exact (stronger condition than ergodicity) to obtain the critical exponent of the Lyapunov exponent from the phase average. Furthermore, we proved that the critical exponent of the Lyapunov exponent is $\frac{1}{2}$ regardl...
In this short note we describe a simple but remarkably effective method for rigorously estimating Ly...
ABSTRACT In contrast to the unilateral claim in some papers that a positive Lyapunov exponent means ...
We propose the existence of a new universality in classical chaotic systems when the number of degre...
The universality of the route to chaos is analytically proven for a countably infinite number of map...
Finite-time Lyapunov exponents of generic chaotic dynamical systems fluctuate in time. These fluctua...
In many applications, there is a desire to determine if the dynamics of interest are chaotic or not....
Akemann G, Burda Z, Kieburg M. From integrable to chaotic systems: Universal local statistics of Lya...
In this study, we prove that a countably infinite number of one-parameterized one-dimensional dynami...
Acknowledgements J.G. acknowledges funds from the Agencia Nacional de Investigación e In nonvación (...
The critical exponent of a finite or infinite word w over a given alphabet is the supremum of the re...
The critical exponent of a finite or infinite word w over a given alphabet is the supremum of the re...
Globally coupled maps (GCMs) are prototypical examples of high-dimensional dynamical systems. Intere...
The critical exponent of a finite or infinite word $w$ over a given alphabet is the supremum of the ...
Sensitive dependence on initial conditions is a major characteristic of chaotic systems. This articl...
Sensitive dependence on initial conditions is a major characteristic of chaotic systems. This articl...
In this short note we describe a simple but remarkably effective method for rigorously estimating Ly...
ABSTRACT In contrast to the unilateral claim in some papers that a positive Lyapunov exponent means ...
We propose the existence of a new universality in classical chaotic systems when the number of degre...
The universality of the route to chaos is analytically proven for a countably infinite number of map...
Finite-time Lyapunov exponents of generic chaotic dynamical systems fluctuate in time. These fluctua...
In many applications, there is a desire to determine if the dynamics of interest are chaotic or not....
Akemann G, Burda Z, Kieburg M. From integrable to chaotic systems: Universal local statistics of Lya...
In this study, we prove that a countably infinite number of one-parameterized one-dimensional dynami...
Acknowledgements J.G. acknowledges funds from the Agencia Nacional de Investigación e In nonvación (...
The critical exponent of a finite or infinite word w over a given alphabet is the supremum of the re...
The critical exponent of a finite or infinite word w over a given alphabet is the supremum of the re...
Globally coupled maps (GCMs) are prototypical examples of high-dimensional dynamical systems. Intere...
The critical exponent of a finite or infinite word $w$ over a given alphabet is the supremum of the ...
Sensitive dependence on initial conditions is a major characteristic of chaotic systems. This articl...
Sensitive dependence on initial conditions is a major characteristic of chaotic systems. This articl...
In this short note we describe a simple but remarkably effective method for rigorously estimating Ly...
ABSTRACT In contrast to the unilateral claim in some papers that a positive Lyapunov exponent means ...
We propose the existence of a new universality in classical chaotic systems when the number of degre...