We study the long-time behaviour of large systems of ordinary differential equations with random data. Our main focus is a Hamiltonian system which describes a distinguished particle attached to a large collection of heat bath particles by springs. In the limit where the size of the heat bath tends to infinity, the trajectory of the distinguished particle can be weakly approximated, on finite time intervals, by a Langevin stochastic differential equation. We examine the long-term behaviour of these trajectories, both analytically and numerically. We find ergodic behaviour manifest in both the long-time empirical measures and in the resulting auto-correlation functions
AbstractWe consider a class of random perturbations of Hamiltonian systems with many degrees of free...
In its classical version, the theory of large deviations makes quantitative statements about the pro...
Several approaches exist to model the evolution of dynamical systems with large populations. These a...
We study the long-time behaviour of large systems of ordinary differential equations with random dat...
We study the long time behaviour of large systems of ordinary differential equations with random dat...
The focus of the proposal is the study of the long time behaviour in dynamical systems. This is a mo...
Diffusion of moving particles in stationary disordered media is studied using a phenomenological mod...
Diffusion of moving particles in stationary disordered media is studied using a phenomenological mod...
The behavior of autocorrelation functions in a K system (the stadium billiard) is studied, and the e...
Abstract: We investigate the long-time behavior of the Glauber dynamics for the ran-dom energy model...
In this paper the authors analyze the long time behavior of certain Markov chains, namely jump proce...
30 pages, 48 ref.We establish a large deviation principle for time dependent trajectories (paths) of...
International audienceWe investigate the dynamics of many-body long-range interacting systems, takin...
Abstract. In recent years there has been considerable interest in understand-ing the motion in Hamil...
We are interested in a kinetic equation intended to describe the interactions of particles with thei...
AbstractWe consider a class of random perturbations of Hamiltonian systems with many degrees of free...
In its classical version, the theory of large deviations makes quantitative statements about the pro...
Several approaches exist to model the evolution of dynamical systems with large populations. These a...
We study the long-time behaviour of large systems of ordinary differential equations with random dat...
We study the long time behaviour of large systems of ordinary differential equations with random dat...
The focus of the proposal is the study of the long time behaviour in dynamical systems. This is a mo...
Diffusion of moving particles in stationary disordered media is studied using a phenomenological mod...
Diffusion of moving particles in stationary disordered media is studied using a phenomenological mod...
The behavior of autocorrelation functions in a K system (the stadium billiard) is studied, and the e...
Abstract: We investigate the long-time behavior of the Glauber dynamics for the ran-dom energy model...
In this paper the authors analyze the long time behavior of certain Markov chains, namely jump proce...
30 pages, 48 ref.We establish a large deviation principle for time dependent trajectories (paths) of...
International audienceWe investigate the dynamics of many-body long-range interacting systems, takin...
Abstract. In recent years there has been considerable interest in understand-ing the motion in Hamil...
We are interested in a kinetic equation intended to describe the interactions of particles with thei...
AbstractWe consider a class of random perturbations of Hamiltonian systems with many degrees of free...
In its classical version, the theory of large deviations makes quantitative statements about the pro...
Several approaches exist to model the evolution of dynamical systems with large populations. These a...