Non-directed polymers in random environments with range penalties: the high dimensional case

Abstract

This paper is a follow-up work of arxiv.org/abs/2101.05949. We study a non-directed polymer model in random environments. The polymer is represented by a simple symmetric random walk S on Zd with d≥2 and the random environment is represented by i.i.d. heavy-tailed random variables with their tail probability decaying polynomially. We perform a Gibbs transform to describe the interaction between polymers and random environments. Up to time N, the law of S is tilted by (Σx∈RN(βωx-h)), where RN is the range of S up to time N, β≥0 is the inverse temperature and h∈R is an external field. By tuning β=βN and h=hN, we establish the phase diagram and study the fluctuations of S under the Gibbs transform and the scaling limits of the (logarithmic) partition function. The novelty and challenge, compared to arxiv.org/abs/2101.05949, is that we also tune the external field h, which brings in various range penalties, unlike in arxiv.org/abs/2101.05949, where h is fixed and merely playing a role of centering for the random environment.