Lyapunov exponents of random walks in small random potential: the upper bound
Abstract
We consider the simple random walk on Zd evolving in a random i.i.d. potential taking values in [0,+∞). The potential is not assumed integrable, and can be rescaled by a multiplicative factor λ > 0. Completing the work started in a companion paper, we give the asymptotic behaviour of the Lyapunov exponents for d 3, both annealed and quenched, as the scale parameter λ tends to zero.
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