The tail distribution of the partition function for directed polymer in the weak disorder phase
Abstract
We investigate the upper tail distribution of the partition function of the directed polymer in a random environment on Zd in the weak disorder phase. We show that the distribution of the infinite volume partition function Wβ∞ displays a power-law decay, with an exponent p*(β)∈ [1+2d,∞). We also prove that the distribution of the suprema of the point-to-point and point-to-line partition functions display the same behavior. On the way to these results, we prove a technical estimate of independent interest: the Lp-norm of the partition function at the time when it overshoots a high value A is comparable to A. We use this estimate to extend the validity of many recent results that were proved under the assumption that the environment is upper bounded.
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