Large deviations for intersection local times in critical dimension

Abstract

Let (Xt,t≥0) be a continuous time simple random walk on Zd (d≥3), and let lT(x) be the time spent by (Xt,t≥0) on the site x up to time T. We prove a large deviations principle for the q-fold self-intersection local time IT=Σx∈ZdlT(x)q in the critical case q=dd-2. When q is integer, we obtain similar results for the intersection local times of q independent simple random walks.