Moments of partition functions of 2D Gaussian polymers in the weak disorder regime -- II

Abstract

Let WN(β) = E0[e Σn=1N β ω(n,Sn) - Nβ2/2] be the partition function of a two-dimensional directed polymer in a random environment, where ω(i,x), i∈ N, x∈ Z2 are i.i.d. standard normal and \Sn\ is the path of a random walk. With β=βN=β π/ N and β∈ (0,1) (the subcritical window), WN(βN) is known to converge in distribution to a Gaussian law of mean -λ2/2 and variance λ2, with λ2= ((1-β2)-1) (Caravenna, Sun, Zygouras, Ann. Appl. Probab. (2017)). We study in this paper the moments E [WN( βN)q] in the subcritical window, and prove a lower bound that matches for q=O( N) the upper bound derived by us in Cosco, Zeitouni, arXiv:2112.03767 [math.PR]. The analysis is based on appropriate decouplings and a Poisson convergence that uses the method of ''two moments suffice''.