Local limit theorem for directed polymers beyond the $L^2$-phase

Stefan Junk

Published 2023-07-11Version 1

We consider the directed polymer model in the weak disorder phase under the assumption that the partition function is $L^p$-bounded for some $p>1+2/d$. We prove a local limit theorem for the polymer measure, i.e., that the point-to-point partition function can be approximated by two point-to-plane partition functions at the start- and endpoint. We furthermore show that for environments with finite support the required $L^p$-boundedness holds in the whole weak disorder phase, except possible for the critical value $\beta_{cr}$. Some consequences of the local limit theorem are also discussed.