Screening effect due to heavy lower tails in one-dimensional parabolic Anderson model
Abstract
We consider the large-time behavior of the solution u [0,∞)×[0,∞) to the parabolic Anderson problem ∂t u= u+ u with initial data u(0,·)=1 and non-positive finite i.i.d. potentials ((z))z∈. Unlike in dimensions d2, the almost-sure decay rate of u(t,0) as t∞ is not determined solely by the upper tails of (0); too heavy lower tails of (0) accelerate the decay. The interpretation is that sites x with large negative (x) hamper the mass flow and hence screen off the influence of more favorable regions of the potential. The phenomenon is unique to d=1. The result answers an open question from our previous study BK00 of this model in general dimension.
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