Free energy of directed polymers in random environment in 1+1-dimension at high temperature

Abstract

We consider the free energy F(β) of the directed polymers in random environment in 1+1-dimension. It is known that F(β) is of order -β4 as β 0. In this paper, we will prove that under a certain condition of the potential, align* β 0F(β)β4=T∞1TPZ[ Z2(T)] =-16, align* where \Zβ(t,x):t≥ 0,x∈R\ is the unique mild solution to the stochastic heat equation align* ∂∂ tZ=12 Z+β Z W,\ \ t 0Z(t,x)dx=δ0(dx), align* where W is a time-space white noise and align* Zβ(t)=∫RZβ(t,x)dx. align*