Renewal structure and local time for diffusions in random environment
Abstract
We study a one-dimensional diffusion X in a drifted Brownian potential W\, with 01, and focus on the behavior of the local times (L(t,x),x) of X before time t0.In particular we characterize the limit law of the supremum of the local time, as well as the position of the favorite sites. These limits can be written explicitly from a two dimensional stable L\'evy process. Our analysis is based on the study of an extension of the renewal structure which is deeply involved in the asymptotic behavior of X.
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