We investigate the main statistical parameters of the integral over time of the fractional Brownian motion and of a kind of pseudo-fractional Gaussian process, obtained as a classical Gauss–Markov process from Doob representation by replacing Brownian motion with fractional Brownian motion. Possible applications in the context of neuronal models are highlighted. A fractional Ornstein–Uhlenbeck process is considered and relations with the integral of the pseudo-fractional Gaussian process are provided.
Abundo, M., Pirozzi, E. (2019). On the Integral of the Fractional Brownian Motion and Some Pseudo-Fractional Gaussian Processes. MATHEMATICS, 7(10), 991 [10.3390/math7100991].
On the Integral of the Fractional Brownian Motion and Some Pseudo-Fractional Gaussian Processes.
Abundo Mario;
2019-01-01
Abstract
We investigate the main statistical parameters of the integral over time of the fractional Brownian motion and of a kind of pseudo-fractional Gaussian process, obtained as a classical Gauss–Markov process from Doob representation by replacing Brownian motion with fractional Brownian motion. Possible applications in the context of neuronal models are highlighted. A fractional Ornstein–Uhlenbeck process is considered and relations with the integral of the pseudo-fractional Gaussian process are provided.| File | Dimensione | Formato | |
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