Operator fractional Brownian motions (OFBMs) are (i) Gaussian, (ii) operator self-similar and (iii) stationary increment processes. They are the natural multivariate generalizations of the well-studied fractional Brownian motions. Because of the possible lack of time-reversibility, the defining properties (i)--(iii) do not, in general, characterize the covariance structure of OFBMs. To circumvent this problem, the class of OFBMs is characterized here by means of their integral representations in the spectral and time domains. For the spectral domain representations, this involves showing how the operator self-similarity shapes the spectral density in the general representation of stationary increment processes. The time domain representatio...
In this paper we develop the spectral theory of the fractional Brownian motion (fBm) using the ideas...
International audienceThis paper deals with the identification of the multivariate fractional Browni...
The Wiener's path integral plays a central role in the studies of Brownian motion. Here we derive ex...
Operator fractional Brownian motions (OFBMs) are (i) Gaussian, (ii) operator self-similar and (iii) ...
Operator fractional Brownian motions (OFBMs) are zero mean, operator self-similar (o.s.s.), Gaussian...
Operator fractional Brownian fields (OFBFs) are Gaussian, stationary-increment vector random fields ...
http://smf4.emath.fr/Publications/SeminairesCongres/2013/28/html/smf_sem-cong_28_65-87.phpInternatio...
Let $X$ be a fractional Brownian motion. It is known that $M_t=int m_t dX,, tge 0$, where $m_t$ is a...
AbstractThe multifractional Brownian motion (MBM) processes are locally self-similar Gaussian proces...
The thesis is centered around the themes of wavelet methods for stochastic processes, and of operato...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
Pre-print; version dated March 2006This paper compares models of fractional processes and associated...
Fractional Brownian motion is a nontrivial generalization of standard Brownian motion (Wie- ner proc...
Fractional Brownian motion (fBm) is a nonstationary self-similar continuous stochastic process used ...
International audienceMultifractional Brownian motion (mBm) was introduced to overcome certain limit...
In this paper we develop the spectral theory of the fractional Brownian motion (fBm) using the ideas...
International audienceThis paper deals with the identification of the multivariate fractional Browni...
The Wiener's path integral plays a central role in the studies of Brownian motion. Here we derive ex...
Operator fractional Brownian motions (OFBMs) are (i) Gaussian, (ii) operator self-similar and (iii) ...
Operator fractional Brownian motions (OFBMs) are zero mean, operator self-similar (o.s.s.), Gaussian...
Operator fractional Brownian fields (OFBFs) are Gaussian, stationary-increment vector random fields ...
http://smf4.emath.fr/Publications/SeminairesCongres/2013/28/html/smf_sem-cong_28_65-87.phpInternatio...
Let $X$ be a fractional Brownian motion. It is known that $M_t=int m_t dX,, tge 0$, where $m_t$ is a...
AbstractThe multifractional Brownian motion (MBM) processes are locally self-similar Gaussian proces...
The thesis is centered around the themes of wavelet methods for stochastic processes, and of operato...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
Pre-print; version dated March 2006This paper compares models of fractional processes and associated...
Fractional Brownian motion is a nontrivial generalization of standard Brownian motion (Wie- ner proc...
Fractional Brownian motion (fBm) is a nonstationary self-similar continuous stochastic process used ...
International audienceMultifractional Brownian motion (mBm) was introduced to overcome certain limit...
In this paper we develop the spectral theory of the fractional Brownian motion (fBm) using the ideas...
International audienceThis paper deals with the identification of the multivariate fractional Browni...
The Wiener's path integral plays a central role in the studies of Brownian motion. Here we derive ex...