Add to ORKGIn a previous paper we developed a mode-coupling theory to describe the long time properties of diffusion in stationary, statistically homogeneous, random media. Here the general theory is applied to deterministic and stochastic Lorentz models and several hopping models. The mode-coupling theory predicts that the amplitudes of the long time tails for these systems are determined by spatial fluctuations in a coarse-grained diffusion coefficient and a coarse-grained free volume. For one-dimensional models these amplitudes can be evaluated, and the mode-coupling theory is shown to agree with exact solutions obtained for these models. For higher-dimensional Lorentz models the formal theory yields expressions which are difficult to evaluate. For...
The Kuramoto-Sivashinsky equation which describes fluid interfaces in several physical contexts is k...
The long time behavior of transport coefficients in a model for spatially heterogeneous media in two...
We study the long-time behaviour of large systems of ordinary differential equations with random dat...
In a previous paper we developed a mode-coupling theory to describe the long time properties of diff...
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...
A mode-coupling formalism is developed for multicomponent systems of parti-cles performing diffusive...
A mode-coupling formalism is developed for multicomponent systems of particles performing diffusive ...
Diffusion processes are considered for one-dimensional stochastic Lorentz models, consisting of rand...
Point scatterers are placed on the real line such that the distances between scatterers are independ...
In this Thesis, the transport behavior of classical wave in 1D random media is studied. Two compleme...
We discuss a conjecture of Alley and Alder predicting a relation between the four-point and the two-...
International audienceThe aim of the paper is to address the long time behavior of the Kuramoto mode...
We consider a collection of linearly interacting diffusions (indexed by a countable space) in a rand...
We consider a collection of linearly interacting diffusions (indexed by a countable space) in a rand...
The Kuramoto-Sivashinsky equation which describes fluid interfaces in several physical contexts is k...
The long time behavior of transport coefficients in a model for spatially heterogeneous media in two...
We study the long-time behaviour of large systems of ordinary differential equations with random dat...
In a previous paper we developed a mode-coupling theory to describe the long time properties of diff...
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...
A mode-coupling formalism is developed for multicomponent systems of parti-cles performing diffusive...
A mode-coupling formalism is developed for multicomponent systems of particles performing diffusive ...
Diffusion processes are considered for one-dimensional stochastic Lorentz models, consisting of rand...
Point scatterers are placed on the real line such that the distances between scatterers are independ...
In this Thesis, the transport behavior of classical wave in 1D random media is studied. Two compleme...
We discuss a conjecture of Alley and Alder predicting a relation between the four-point and the two-...
International audienceThe aim of the paper is to address the long time behavior of the Kuramoto mode...
We consider a collection of linearly interacting diffusions (indexed by a countable space) in a rand...
We consider a collection of linearly interacting diffusions (indexed by a countable space) in a rand...
The Kuramoto-Sivashinsky equation which describes fluid interfaces in several physical contexts is k...
The long time behavior of transport coefficients in a model for spatially heterogeneous media in two...
We study the long-time behaviour of large systems of ordinary differential equations with random dat...