Berry-Ess\'een bounds and almost sure CLT for the quadratic variation of the bifractional Brownian motion

Abstract

Let B be a bifractional Brownian motion with parameters H∈ (0, 1) and K∈(0,1]. For any n≥1, set Zn =Σi=0n-1[n2HK(B(i+1)/n-Bi/n)2-((Bi+1-Bi)2)]. We use the Malliavin calculus and the so-called Stein's method on Wiener chaos introduced by Nourdin and Peccati NP09 to derive, in the case when 0<HK≤3/4, Berry-Ess\'een-type bounds for the Kolmogorov distance between the law of the correct renormalization Vn of Zn and the standard normal law. Finally, we study almost sure central limit theorems for the sequence Vn.