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, $\gamma >0$.

References

[1]

Androshchuk, T.: Approximation the integrals with respect to fBm by the integrals with respect to absolutely continuous processes. Theory Probab. Math. Stat. 73, 11–20 (2005). MR2213333. https://doi.org/10.1090/S0094-9000-07-00678-3

[2]

Androshchuk, T., Mishura, Yu.: Mixed Brownian–fractional Brownian model: absence of arbitrage and related topics. Stoch. Int. J. Probab. Stoch. Process. 78(5), 281–300 (2006). MR2270939. https://doi.org/10.1080/17442500600859317

[3]

Banna, O., Mishura, Yu., Ralchenko, K., Shklyar, S.: Fractional Brownian Motion. Approximations and Projections. Wiley-ISTE, London (2019). 288 p.

[4]

Banna, O.L., Mishura, Yu.S.: Approximation of fractional Brownian motion with associated Hurst index separated from 1 by stochastic integrals of linear power functions. Theory Stoch. Process. 14(30)(3-4), 1–16 (2008). MR2498600

[5]

Banna, O.L., Mishura, Yu.S.: Estimation of the distance between fractional Brownian motion and the space of Gaussian martingales on a segment. Theory Probab. Math. Stat. 83, 12–21 (2010). MR2768845. https://doi.org/10.1090/S0094-9000-2012-00838-7

[6]

Fichtenholz, G.M.: The fundamentals of mathematical analysis. International series of monographs on pure and applied mathematics 72(73), Pergamon Press (1965)

[7]

Gatheral, J., Jaisson, Th., Rosenbaum, M.: Volatility is rough. Quant. Finance 18 (2018). MR3805308. https://doi.org/10.1080/14697688.2017.1393551

[8]

Mishura, Yu.S., Banna, O.L.: Approximation of fractional Brownian motion by Wiener integrals. Theory Probab. Math. Stat. 79, 106–115 (2008). MR2494540. https://doi.org/10.1090/S0094-9000-09-00773-X

[9]

Norros, I., Valkeila, E., Virtamo, J.: An elementary approach to a Girsanov formula and other analytical results on fractional Brownian motions. Bernoulli 5(4), 571–587 (1999). MR1704556. https://doi.org/10.2307/3318691

[10]

Shklyar, S., Shevchenko, G., Mishura, Yu., Doroshenko, V., Banna, O.: Approximation of fractional Brownian motion by martingales. Methodol. Comput. Appl. Probab. 16(3), 539–560 (2014). MR3239808. https://doi.org/10.1007/s11009-012-9313-8

[11]

Skorohod, A.V.: Random Processes with Independent Increments. Series: Mathematics and its Applications (Book 47). Springer (1991). MR1155400. https://doi.org/10.1007/978-94-011-3710-2

[12]

Thao, T.H.: A note on fractional Brownian motion. Vietnam J. Math. 31(3), 255–260 (2003)

Full article Related articles Cited by

Open access article under the CC BY license.

Keywords

Fractional Brownian motion martingale approximation

MSC2010

60G22 60G44

Metrics

since March 2018

643

Article info
views

445

Full article
views

397

PDF
downloads

155

XML
downloads

RSS

Authors

Abstract

References

Export citation

Copy and paste formatted citation

Download citation in file