We consider the asymmetric exclusion process with a driven tagged particle on Z which has different jump rates from other particles. When the non-tagged particles have non-nearest-neighbor jump rates , we show that the tagged particle can have a speed which has a different sign from the mean derived from its jump rates. We also show the existence of some non-trivial invariant measures for the environment process viewed from the tagged particle. Our arguments are based on coupling, martingale methods, and analyzing currents through fixed bonds
We investigate the behavior of a tagged particle under the action of an external constant driving fo...
The asymmetric simple exclusion process (ASEP) on a one-dimensional lattice is a system of particles...
We study an asymmetric exclusion model with one dynamic roadblock particle. The roadblock particle i...
We investigate a tagged particle in the exclusion processes on {1,..., N} x Z(d), with different den...
In this work we studied the Exclusion Process, one of the classical and most simple interacting par...
We study a one-dimensional nearest neighbor simple exclusion process for which the rates of jump are...
International audienceWe study finite size effects in the variance of the displacement of a tagged p...
AbstractWe study a one-dimensional nearest neighbor simple exclusion process for which the rates of ...
Abstract. Driven diffusive systems are often used as simple discrete models of collective transport ...
We introduce k-step exclusion processes as generalizations of the simple exclu-sion process. We stat...
We prove moderate deviation principles for the tagged particle position and current in one dimension...
We prove a functional Central Limit Theorem for the position of a Tagged Particle in the one-dimensi...
AbstractWe prove a functional central limit theorem for the position of a tagged particle in the one...
The slow-to-start mechanism is known to play an important role in the particular shape of the Fundam...
We consider a totally asymmetric simple exclusion process (TASEP) consisting of particles on a latti...
We investigate the behavior of a tagged particle under the action of an external constant driving fo...
The asymmetric simple exclusion process (ASEP) on a one-dimensional lattice is a system of particles...
We study an asymmetric exclusion model with one dynamic roadblock particle. The roadblock particle i...
We investigate a tagged particle in the exclusion processes on {1,..., N} x Z(d), with different den...
In this work we studied the Exclusion Process, one of the classical and most simple interacting par...
We study a one-dimensional nearest neighbor simple exclusion process for which the rates of jump are...
International audienceWe study finite size effects in the variance of the displacement of a tagged p...
AbstractWe study a one-dimensional nearest neighbor simple exclusion process for which the rates of ...
Abstract. Driven diffusive systems are often used as simple discrete models of collective transport ...
We introduce k-step exclusion processes as generalizations of the simple exclu-sion process. We stat...
We prove moderate deviation principles for the tagged particle position and current in one dimension...
We prove a functional Central Limit Theorem for the position of a Tagged Particle in the one-dimensi...
AbstractWe prove a functional central limit theorem for the position of a tagged particle in the one...
The slow-to-start mechanism is known to play an important role in the particular shape of the Fundam...
We consider a totally asymmetric simple exclusion process (TASEP) consisting of particles on a latti...
We investigate the behavior of a tagged particle under the action of an external constant driving fo...
The asymmetric simple exclusion process (ASEP) on a one-dimensional lattice is a system of particles...
We study an asymmetric exclusion model with one dynamic roadblock particle. The roadblock particle i...