Distance from fractional Brownian motion with associated Hurst index 0&lt;H&lt;1/2 to the subspaces of Gaussian martingales involving power integrands with an arbitrary positive exponent

Banna, Oksana; Buryak, Filipp; Mishura, Yuliya

doi:10.15559/20-VMSTA156

Modern Stochastics: Theory and Applications

Distance from fractional Brownian motion with associated Hurst index

0 < H < 1 / 2

to the subspaces of Gaussian martingales involving power integrands with an arbitrary positive exponent

Volume 7, Issue 2 (2020), pp. 191–202

Oksana Banna

Filipp Buryak Yuliya Mishura

https://doi.org/10.15559/20-VMSTA156

Pub. online: 23 June 2020 Type: Research Article

Open Access

Received
22 April 2020

Revised
6 June 2020

Accepted
6 June 2020

Published
23 June 2020

Abstract

We find the best approximation of the fractional Brownian motion with the Hurst index $H\in (0,1/2)$ by Gaussian martingales of the form ${\textstyle\int _{0}^{t}}{s^{\gamma }}d{W_{s}}$, where W is a Wiener process, $\gamma >0$.

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Keywords

Fractional Brownian motion martingale approximation

MSC2010

60G22 60G44

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