We extend the recently developed generalized Floquet theory [Phys. Rev. Lett. 110, 170602 (2013)] to systems with innite memory, i.e., a dependence on the whole previous history. In particular, we show that a lower asymptotic bound exists for the Floquet exponents associated to such cases. As examples, we analyze the cases of an ideal 1D system, a Brownian particle, and a circuit resonator with an ideal transmission line. All these examples show the usefulness of this new approach to the study of dynamical systems with memory, which are ubiquitous in science and technology
International audienceWe give an example of a sequential dynamical system consisting of intermittent...
A universal feature of topological insulators is that they cannot be adiabatically connected to an a...
Electrons in a lattice exhibit time-periodic motion, known as Bloch oscillation, when subject to an ...
Floquet theory is a powerful tool in the analysis of many physical phenomena, and extended to spatia...
We discuss several classes of integrable Floquet systems, i.e. systems which do not exhibit chaotic ...
In this contribution we study the stability of the limit cycles characterizing the dynamics of a 2D ...
AbstractIn this paper, we study periodic linear systems on periodic time scales which include not on...
We give a general overview of the high-frequency regime in periodically driven systems and identify ...
Our aim in this paper is twofold. Firstly, we develop a new asymptotic theory for Floquet exponents....
We develop a low-frequency perturbation theory in the extended Floquet Hilbert space of a periodical...
We unite chaotic Optofluidics and chaotic Electronics in a single class of topologically-equivalent ...
In this Letter, we study two-dimensional Floquet conformal field theory, where the external periodic...
We study the low-frequency dynamics of periodically driven one-dimensional systems hosting Floquet t...
A chaotic signal loses the memory of the initial conditions with time, and the future behavior becom...
This dissertation presents a self-contained study of periodically-driven quantum systems. Following ...
International audienceWe give an example of a sequential dynamical system consisting of intermittent...
A universal feature of topological insulators is that they cannot be adiabatically connected to an a...
Electrons in a lattice exhibit time-periodic motion, known as Bloch oscillation, when subject to an ...
Floquet theory is a powerful tool in the analysis of many physical phenomena, and extended to spatia...
We discuss several classes of integrable Floquet systems, i.e. systems which do not exhibit chaotic ...
In this contribution we study the stability of the limit cycles characterizing the dynamics of a 2D ...
AbstractIn this paper, we study periodic linear systems on periodic time scales which include not on...
We give a general overview of the high-frequency regime in periodically driven systems and identify ...
Our aim in this paper is twofold. Firstly, we develop a new asymptotic theory for Floquet exponents....
We develop a low-frequency perturbation theory in the extended Floquet Hilbert space of a periodical...
We unite chaotic Optofluidics and chaotic Electronics in a single class of topologically-equivalent ...
In this Letter, we study two-dimensional Floquet conformal field theory, where the external periodic...
We study the low-frequency dynamics of periodically driven one-dimensional systems hosting Floquet t...
A chaotic signal loses the memory of the initial conditions with time, and the future behavior becom...
This dissertation presents a self-contained study of periodically-driven quantum systems. Following ...
International audienceWe give an example of a sequential dynamical system consisting of intermittent...
A universal feature of topological insulators is that they cannot be adiabatically connected to an a...
Electrons in a lattice exhibit time-periodic motion, known as Bloch oscillation, when subject to an ...