A chaotic signal loses the memory of the initial conditions with time, and the future behavior becomes unpredictable. Here we propose a method to understand the loss of memory with time from a time series. This is done by introducing time-dependent generalized exponents. The asymptotic behavior of these exponents is interesting and can distinguish between chaotic systems that lose memory of the initial conditions completely, those that partially retain the memory, and those (borderline of chaos) that fully retain the memory. We discuss these features with some illustrative examples
Recurrent networks of randomly coupled rate neurons display a transition to chaos at a critical coup...
The hallmark of deterministic chaos is that it creates information - the rate being given by the Kol...
In this chapter, we first precise the concept of dynamical systems, and then we introduce the concep...
We propose here a new method to characterize the loss of memory with time in a chaotic system from a...
Abstract. This paper discusses the evolution of probability distributions for certain time-dependent...
International audienceWe give an example of a sequential dynamical system consisting of intermittent...
International audienceCurrently the long memory behavior is associated to stochastic processes. It c...
Certain deterministic non-linear systems may show chaotic behaviour. Time series derived from such s...
Excitable systems display memory, but how memory affects the excitation dynamics of such systems rem...
Certain deterministic non-linear systems may show chaotic behaviour. Time series derived from such s...
This book examines discrete dynamical systems with memory—nonlinear systems that exist extensively i...
Certain deterministic non-linear systems may show chaotic behaviour. Time series derived from such s...
We present a forecasting technique for chaotic data. After embedding a time series in a state space ...
We introduce the basic concepts and methods to formalize and analyze deterministic chaos, with links...
We propose a new method for detecting low-dimensional chaotic time series when there is dynamical no...
Recurrent networks of randomly coupled rate neurons display a transition to chaos at a critical coup...
The hallmark of deterministic chaos is that it creates information - the rate being given by the Kol...
In this chapter, we first precise the concept of dynamical systems, and then we introduce the concep...
We propose here a new method to characterize the loss of memory with time in a chaotic system from a...
Abstract. This paper discusses the evolution of probability distributions for certain time-dependent...
International audienceWe give an example of a sequential dynamical system consisting of intermittent...
International audienceCurrently the long memory behavior is associated to stochastic processes. It c...
Certain deterministic non-linear systems may show chaotic behaviour. Time series derived from such s...
Excitable systems display memory, but how memory affects the excitation dynamics of such systems rem...
Certain deterministic non-linear systems may show chaotic behaviour. Time series derived from such s...
This book examines discrete dynamical systems with memory—nonlinear systems that exist extensively i...
Certain deterministic non-linear systems may show chaotic behaviour. Time series derived from such s...
We present a forecasting technique for chaotic data. After embedding a time series in a state space ...
We introduce the basic concepts and methods to formalize and analyze deterministic chaos, with links...
We propose a new method for detecting low-dimensional chaotic time series when there is dynamical no...
Recurrent networks of randomly coupled rate neurons display a transition to chaos at a critical coup...
The hallmark of deterministic chaos is that it creates information - the rate being given by the Kol...
In this chapter, we first precise the concept of dynamical systems, and then we introduce the concep...