Kolmogorov equation and large-time behaviour for fractional Brownian motion driven linear SDE's

Michal Vyoral

Displaying similar documents to “Kolmogorov equation and large-time behaviour for fractional Brownian motion driven linear SDE's”

Stochastic evolution equations driven by Liouville fractional Brownian motion

Zdzisław Brzeźniak, Jan van Neerven, Donna Salopek (2012)

Czechoslovak Mathematical Journal

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Let $H$ be a Hilbert space and $E$ a Banach space. We set up a theory of stochastic integration of $ℒ (H, E)$ -valued functions with respect to $H$ -cylindrical Liouville fractional Brownian motion with arbitrary Hurst parameter $0 < β < 1$ . For $0 < β < \frac{1}{2}$ we show that a function $Φ : (0, T) \to ℒ (H, E)$ is stochastically integrable with respect to an $H$ -cylindrical Liouville fractional Brownian motion if and only if it is stochastically integrable with respect to an $H$ -cylindrical fractional Brownian motion. We apply our results to stochastic...

Itô's formula with respect to fractional Brownian motion and its application.

Dai, W., Heyde, C.C. (1996)

Journal of Applied Mathematics and Stochastic Analysis

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Stochastic calculus with respect to fractional Brownian motion

David Nualart (2006)

Annales de la faculté des sciences de Toulouse Mathématiques

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Fractional Brownian motion (fBm) is a centered self-similar Gaussian process with stationary increments, which depends on a parameter $H \in (0, 1)$ called the Hurst index. In this conference we will survey some recent advances in the stochastic calculus with respect to fBm. In the particular case $H = 1 / 2$ , the process is an ordinary Brownian motion, but otherwise it is not a semimartingale and Itô calculus cannot be used. Different approaches have been introduced to construct stochastic integrals with...