Aging and quenched localization for one-dimensional random walks in random environment in the sub-ballistic regime

Christophe Sabot (ICJ); Nathana\"el Enriquez (MODAL'X; Olivier Zindy (MODAL'X; Pma); WIAS)

arxiv: 0711.1095 · v3 · submitted 2007-11-07 · 🧮 math.PR · math-ph· math.MP

Aging and quenched localization for one-dimensional random walks in random environment in the sub-ballistic regime

Nathana\"el Enriquez (MODAL'X , Pma) , Christophe Sabot (ICJ) , Olivier Zindy (MODAL'X , WIAS) This is my paper

classification 🧮 math.PR math-phmath.MP

keywords randomagingenvironmentlocalizationone-dimensionalquenchedwalkwalks

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We consider transient one-dimensional random walks in random environment with zero asymptotic speed. An aging phenomenon involving the generalized Arcsine law is proved using the localization of the walk at the foot of "valleys" of height $\log t$. In the quenched setting, we also sharply estimate the distribution of the walk at time $t$.

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Aging and quenched localization for one-dimensional random walks in random environment in the sub-ballistic regime

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