Some extensions of fractional Brownian motion and sub-fractional Brownian motion related to particle systems.

Bojdecki, Tomasz; Gorostiza, Luis G.; Talarczyk, Anna

Displaying similar documents to “Some extensions of fractional Brownian motion and sub-fractional Brownian motion related to particle systems.”

On the small deviation problem for some iterated processes.

Aurzada, Frank, Lifshits, Mikhail (2009)

Electronic Journal of Probability [electronic only]

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Fractional Ornstein-Uhlenbeck processes.

Cheridito, Patrick, Kawaguchi, Hideyuki, Maejima, Makoto (2003)

Electronic Journal of Probability [electronic only]

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On the mixed fractional Brownian motion.

Zili, Mounir (2006)

Journal of Applied Mathematics and Stochastic Analysis

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Differential equations driven by fractional Brownian motion.

David Nualart, Aurel Rascanu (2002)

Collectanea Mathematica

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A global existence and uniqueness result of the solution for multidimensional, time dependent, stochastic differential equations driven by a fractional Brownian motion with Hurst parameter H > 1/2 is proved. It is shown, also, that the solution has finite moments. The result is based on a deterministic existence and uniqueness theorem whose proof uses a contraction principle and a priori estimates.

Spherical and hyperbolic fractional Brownian motion.

Istas, Jacques (2005)

Electronic Communications in Probability [electronic only]

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Linear filtering with fractional Brownian motion in the signal and observation processes.

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Journal of Applied Mathematics and Stochastic Analysis

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A Milstein-type scheme without Lévy area terms for SDEs driven by fractional brownian motion

A. Deya, A. Neuenkirch, S. Tindel (2012)

Annales de l'I.H.P. Probabilités et statistiques

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In this article, we study the numerical approximation of stochastic differential equations driven by a multidimensional fractional Brownian motion (fBm) with Hurst parameter greater than 1/3. We introduce an implementable scheme for these equations, which is based on a second-order Taylor expansion, where the usual Lévy area terms are replaced by products of increments of the driving fBm. The convergence of our scheme is shown by means of a combination of rough paths techniques and error...

Self-similarity and fractional Brownian motion on Lie groups.

Baudoin, Fabrice, Coutin, Laure (2008)

Electronic Journal of Probability [electronic only]

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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...

Power variation of multiple fractional integrals

Constantin Tudor, Maria Tudor (2007)

Open Mathematics

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