Strassen's local law of the iterated logarithm for the generalized fractional Brownian motion

Abstract

Let X:=\X(t)\t0 be a generalized fractional Brownian motion given by \X(t)\t0d=\ ∫ R ((t-u)+α-(-u)+α ) |u|-γ/2 B(du) \t0, with parameters γ∈ (0, 1) and α∈ (-1/2+ γ/2, \, 1/2+γ/2). This process was introduced by Pang and Taqqu (2019) as the scaling limit of a class of power-law shot noise processes. The parameters α and γ govern the probabilistic and statistical properties of X. In particular, the parameter γ breaks the stationarity of increments of X. In this paper, we establish Strassen's local law of the iterated logarithm for X at a given point t0 ∈ (0, ∞). This result describes explicitly the roles played by the parameters α, γ, and the location t0. Our theorem differs from the earlier Strassen's global law of the iterated logarithm for X proved by Ichiba, Pang and Taqqu (2022).