On the probability distribution of the local times of diagonally operator-self-similar Gaussian fields with stationary increments

Abstract

In this paper we study the local times of vector-valued Gaussian fields that are `diagonally operator-self-similar' and whose increments are stationary. Denoting the local time of such a Gaussian field around the spatial origin and over the temporal unit hypercube by Z, we show that there exists λ∈(0,1) such that under some quite weak conditions, n→ +∞[n]E(Zn)nλ and x→ +∞- P(Z>x)x1λ both exist and are strictly positive (possibly +∞). Moreover, we show that if the underlying Gaussian field is `strongly locally nondeterministic', the above limits will be finite as well. These results are then applied to establish similar statements for the intersection local times of diagonally operator-self-similar Gaussian fields with stationary increments.