Lower functions and Chung's LILs of the generalized fractional Brownian motion

Abstract

Let X:=\X(t)\t0 be a generalized fractional Brownian motion (GFBM) introduced by Pang and Taqqu (2019): \X(t)\t0d=\ ∫ R ((t-u)+α-(-u)+α ) |u|-γ B(du) \t0, with parameters γ ∈ (0, 1/2) and α∈ (-12+ γ , \, 12+ γ ). Continuing the studies of sample path properties of GFBM X in Ichiba, Pang and Taqqu (2021) and Wang and Xiao (2021), we establish integral criteria for the lower functions of X at t=0 and at infinity by modifying the arguments of Talagrand (1996). As a consequence of the integral criteria, we derive the Chung-type laws of the iterated logarithm of X at the t=0 and at infinity, respectively. This solves a problem in Wang and Xiao (2021).