Optimal bounds for self-intersection local times

Abstract

For a random walk Sn, n≥ 0 in Zd, let l(n,x) be its local time at the site x∈ Zd. Define the α-fold self intersection local time Ln(α) := Σx l(n,x)α, and let Ln(α|ε, d) the corresponding quantity for d-dimensional simple random walk. Without imposing any moment conditions, we show that the variances of the local times var(Ln(α)) of any genuinely d-dimensional random walk are bounded above by the corresponding characteristics of the simple symmetric random walk in Zd, i.e. var(Ln(α)) ≤ C var[Ln(α|ε, d)] Kd,αvd,α(n). In particular, variances of local times of all genuinely d-dimensional random walks, d≥ 4, are similar to the 4-dimensional symmetric case var(Ln(α)) = O(n). On the other hand, in dimensions d≤ 3 the resemblance to the simple random walk n ∞ var(Ln(α))/vd,α(n)>0 implies that the jumps must have zero mean and finite second moment.