The Intermediate Disorder Regime for Directed Polymers in Dimension 1+1

Abstract

We introduce a new disorder regime for directed polymers with one space and one time dimension that is accessed by scaling the inverse temperature parameter β with the length of the polymer n. We scale βn := β n-α for alpha non-negative. This scaling sits in between the usual weak disorder (β = 0) and strong disorder regimes (β > 0). The fluctuation exponents zeta for the polymer endpoint and for the free energy depend on α in this regime, with α = 0 corresponding to the usual polymer exponents ζ = 2/3, = 1/3 and α >= 1/4 corresponding to the simple random walk exponents ζ = 1/2, = 0. For 0 < α < 1/4 the exponents interpolate linearly between these two extremes. At α = 1/4 we exactly identify the limiting distribution of the free energy and the end point of the polymer.