Add to ORKGThis paper completes a former version by adding a quenched analysis of the distribution of hitting timesWe consider transient random walks in random environment on $\Z$ in the positive speed (ballistic) and critical zero speed regimes. A classical result of Kesten, Kozlov and Spitzer proves that the hitting time of level $n$, after proper centering and normalization, converges to a completely asymmetric stable distribution, but does not describe its scale parameter. Following [7], where the (non-critical) zero speed case was dealt with, we give a new proof of this result in the subdiffusive case that provides a complete description of the limit law. Furthermore, our proof enables us to give a description of the quenched distribution of hitt...
We consider transient one-dimensional random walks in random environment with zero asymptotic speed....
International audienceWe consider transient one-dimensional random walks in random environment with ...
International audienceWe consider transient one-dimensional random walks in random environment with ...
This paper completes a former version by adding a quenched analysis of the distribution of hitting t...
This paper completes a former version by adding a quenched analysis of the distribution of hitting t...
This paper completes a former version by adding a quenched analysis of the distribution of hitting t...
This paper completes a former version by adding a quenched analysis of the distribution of hitting t...
We consider transient random walks in random environment on Z in the positive speed (ballistic) and ...
International audienceWe consider transient random walks in random environment on $\z$ with zero asy...
International audienceWe consider transient random walks in random environment on $\z$ with zero asy...
International audienceWe consider transient random walks in random environment on $\z$ with zero asy...
This reviewed version was accepted for publication in Annals of Applied ProbabilityInternational aud...
This reviewed version was accepted for publication in Annals of Applied ProbabilityInternational aud...
This reviewed version was accepted for publication in Annals of Applied ProbabilityInternational aud...
This reviewed version was accepted for publication in Annals of Applied ProbabilityInternational aud...
We consider transient one-dimensional random walks in random environment with zero asymptotic speed....
International audienceWe consider transient one-dimensional random walks in random environment with ...
International audienceWe consider transient one-dimensional random walks in random environment with ...
This paper completes a former version by adding a quenched analysis of the distribution of hitting t...
This paper completes a former version by adding a quenched analysis of the distribution of hitting t...
This paper completes a former version by adding a quenched analysis of the distribution of hitting t...
This paper completes a former version by adding a quenched analysis of the distribution of hitting t...
We consider transient random walks in random environment on Z in the positive speed (ballistic) and ...
International audienceWe consider transient random walks in random environment on $\z$ with zero asy...
International audienceWe consider transient random walks in random environment on $\z$ with zero asy...
International audienceWe consider transient random walks in random environment on $\z$ with zero asy...
This reviewed version was accepted for publication in Annals of Applied ProbabilityInternational aud...
This reviewed version was accepted for publication in Annals of Applied ProbabilityInternational aud...
This reviewed version was accepted for publication in Annals of Applied ProbabilityInternational aud...
This reviewed version was accepted for publication in Annals of Applied ProbabilityInternational aud...
We consider transient one-dimensional random walks in random environment with zero asymptotic speed....
International audienceWe consider transient one-dimensional random walks in random environment with ...
International audienceWe consider transient one-dimensional random walks in random environment with ...