Occupation Time Statistics in the Quenched Trap Model
Abstract
We investigate the distribution of occupation times for a particle undergoing a random walk among random energy traps and in the presence of a deterministic potential field U det(x). When the distribution of energy traps is exponential with a width Tg we find that the occupation time statistics behaves according to (i) the canonical Boltzmann theory when T>Tg, (ii) while for T<Tg they are distributed according to the Lamperti distribution with the asymmetry of the distribution determined by the Boltzmann factor (-U det(x)/Tg) with Tg and not T being the effective temperature. We explain how our results describe occupation times in other systems with quenched disorder, when the underlying partition function of the problem is a random variable distributed according to L\'evy statistics.
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