Let $B^{H,K}=(B^{H,K}_{t}, t\geq 0)$ be a bifractional Brownian motion with
two parameters $H\in (0,1)$ and $K\in(0,1]$. The main result of this paper is
that the increment process generated by the bifractional Brownian motion
$(B^{H,K}_{h+t} -B^{H,K}_{h}, t\geq 0)$ converges when $h\to \infty$ to
$(2^{(1-K)/{2}}B^{HK}_{t}, t\geq 0)$, where $(B^{HK}_{t}, t\geq 0)$ 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
$B^{H,K}$

Maejima, Makoto

Tudor, Ciprian

English

arXiv

Makoto Maejima

Ciprian A Tudor

Crossref

Communications on Stochastic Analysis

Limits of bifractional Brownian noises

Tudor, Ciprian A

LSU Scholarly Repository (Louisiana State Univ.)

International audienceLet $B^{H,K}=\left (B^{H,K}_{t}, t\geq 0\right )$ be a bifractional Brownian motion with two parameters $H\in (0,1)$ and $K\in(0,1]$. The main result of this paper is that the increment process generated by the bifractional Brownian motion $\left( B^{H,K}_{h+t} -B^{H,K} _{h}, t\geq 0\right)$ converges when $h\to \infty$ to $\left (2^{(1-K)/{2}}B^{HK} _{t}, t\geq 0\right )$, where $\left (B^{HK}_{t}, t\geq 0\right)$ 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 $B^{H,K}$

Tudor, Ciprian, A.

HAL-Paris1

https://digitalcommons.lsu.edu/cgi/viewcontent.cgi?article=1069&context=cosa

Limits of bifractional Brownian noises

Abstract

Similar works

Full text

Available Versions

Crossref

LSU Scholarly Repository (Louisiana State Univ.)

HAL-Paris1