The half-space log-Gamma polymer in the bound phase
Abstract
We consider the log-Gamma polymer in the half-space with bulk weights distributed as Gamma-1(2θ) and diagonal weights as Gamma-1(α+θ) for θ>0 and α>-θ. We show that in the bound phase, i.e., when α∈ (-θ,0), the endpoint of the polymer lies within an O(1) stochastic window of the diagonal. This result gives the first rigorous proof of the pinned phenomena for the half-space polymers in the bound phase conjectured by Kardar(1985). We also show that the limiting quenched endpoint distribution of the polymer around the diagonal is given by a random probability mass function proportional to the exponential of a random walk with log-Gamma type increments.
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