Exponential moments of self-intersection local times of stable random walks in subcritical dimensions

Abstract

Let (Xt, t ≥ 0) be an α-stable random walk with values in d. Let lt(x) = ∫0t δx(Xs) ds be its local time. For p>1, not necessarily integer, It = Σx ltp(x) is the so-called p-fold self- intersection local time of the random walk. When p(d -α) < d, we derive precise logarithmic asymptotics of the probability P(It ≥ rt) for all scales rt (It). Our result extends previous works by Chen, Li and Rosen 2005, Becker and K\"onig 2010, and Laurent 2012.