Large deviations for self-intersection local times in subcritical dimensions

Abstract

Let (Xt,t≥ 0) be a random walk on Zd. Let lt(x)= ∫0t δx(Xs)ds be the local time at site x and It= Σx∈Zd lt(x)p the p-fold self-intersection local time (SILT). Becker and K\"onig have recently proved a large deviations principle for It for all (p,d)∈Rd×Zd such that p(d-2)<2. We extend these results to a broader scale of deviations and to the whole subcritical domain p(d-2)<d. Moreover we unify the proofs of the large deviations principle using a method introduced by Castell for the critical case p(d-2)=d and developed by Laurent for the critical and supercritical case p(d-α)≥ d of α-stable random walk.