Large Deviations and Phase Transition for Random Walks in Random Nonnegative Potentials
Abstract
We establish large deviation principles and phase transition results for both quenched and annealed settings of nearest-neighbor random walks with constant drift in random nonnegative potentials on Zd. We complement the analysis of Zer, where a shape theorem on the Lyapunov functions and a large deviation principle in absence of the drift are achieved for the quenched setting.
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