Limits of bifractional Brownian noises

Abstract

Let BH,K=(BH,Kt, t≥ 0) be a bifractional Brownian motion with two parameters H∈ (0,1) and K∈(0,1]. The main result of this paper is that the increment process generated by the bifractional Brownian motion (BH,Kh+t -BH,Kh, t≥ 0) converges when h ∞ to (2(1-K)/2BHKt, t≥ 0), where (BHKt, t≥ 0) is the fractional Brownian motion with Hurst index HK. We also study the behavior of the noise associated to the bifractional Brownian motion and limit theorems to BH,K.