Local limit theorem and equivalence of dynamic and static points of view for certain ballistic random walks in i.i.d. environments

Authors
Berger, Noam Rosenthal, Ron Cohen, Moran
Citation
Berger, Noam et al., Local limit theorem and equivalence of dynamic and static points of view for certain ballistic random walks in i.i.d. environments, Annals of probability (Online) , 44(4), 2016, pp. 2889-2979
Journal title
Annals of probability (Online) ACNP
ISSN journal
2168894X
Volume
44
Issue
4
Year of publication
2016
Pages
2889 - 2979
Database
ACNP
SICI code
Abstract
In this work, we discuss certain ballistic random walks in random environments on Zd, and prove the equivalence between the static and dynamic points of view in dimension d.4. Using this equivalence, we also prove a version of a local limit theorem which relates the local behavior of the quenched and annealed measures of the random walk by a prefactor.