This paper focuses on simulating fractional Brownian motion (fBm). Despite the availability of several exact simulation methods, attention has been paid to approximate simulation (i.e., the output is approximately fBm), particularly because of possible time savings. In this paper, we study the class of approximate methods that are based on the spectral properties of fBm's stationary incremental process, usually called fractional Gaussian noise (fGn). The main contribution is a proof of asymptotical exactness (in a sense that is made precise) of these spectral methods. Moreover, we establish the connection between the spectral simulation approach and a widely used method, originally proposed by Paxson, that lacked a formal mathematical justi...
Abstract: We present a non exhaustive bibliographical and comparative study of the problem of sim-ul...
International audienceA generalization of fractional Brownian motion (fBm) of parameter H in ]0, 1[ ...
AbstractBesides fractional Brownian motion most non-Gaussian fractional fields are obtained by integ...
This paper focuses on simulating fractional Brownian motion (fBm). Despite the availability of sever...
We present a non exhaustive bibliographical and comparative study of the problem of simulation and i...
We reexamine the wavelet-based simulation procedure for fractional Brownian motion proposed by Abry ...
In the paper, we consider the problem of simulation of a strictly ?-sub-Gaussian generalized fractio...
AbstractWe reexamine the wavelet-based simulation procedure for fractional Brownian motion proposed ...
Let $X$ be a fractional Brownian motion. It is known that $M_t=int m_t dX,, tge 0$, where $m_t$ is a...
[[abstract]]© 2002 Institute of Electrical and Electronics Engineers-The purpose of this paper is to...
International audienceThe use of diffusion models driven by fractional noise has become popular for ...
In time fractional models, the solution depends on all its past history; therefore such models are a...
Stochastic processes exhibiting power-law slopes in the frequency domain are frequently well modeled...
To simulate Gaussian fields poses serious numerical problems: storage and computing time. The midpoi...
In this paper we develop the spectral theory of the fractional Brownian motion (fBm) using the ideas...
Abstract: We present a non exhaustive bibliographical and comparative study of the problem of sim-ul...
International audienceA generalization of fractional Brownian motion (fBm) of parameter H in ]0, 1[ ...
AbstractBesides fractional Brownian motion most non-Gaussian fractional fields are obtained by integ...
This paper focuses on simulating fractional Brownian motion (fBm). Despite the availability of sever...
We present a non exhaustive bibliographical and comparative study of the problem of simulation and i...
We reexamine the wavelet-based simulation procedure for fractional Brownian motion proposed by Abry ...
In the paper, we consider the problem of simulation of a strictly ?-sub-Gaussian generalized fractio...
AbstractWe reexamine the wavelet-based simulation procedure for fractional Brownian motion proposed ...
Let $X$ be a fractional Brownian motion. It is known that $M_t=int m_t dX,, tge 0$, where $m_t$ is a...
[[abstract]]© 2002 Institute of Electrical and Electronics Engineers-The purpose of this paper is to...
International audienceThe use of diffusion models driven by fractional noise has become popular for ...
In time fractional models, the solution depends on all its past history; therefore such models are a...
Stochastic processes exhibiting power-law slopes in the frequency domain are frequently well modeled...
To simulate Gaussian fields poses serious numerical problems: storage and computing time. The midpoi...
In this paper we develop the spectral theory of the fractional Brownian motion (fBm) using the ideas...
Abstract: We present a non exhaustive bibliographical and comparative study of the problem of sim-ul...
International audienceA generalization of fractional Brownian motion (fBm) of parameter H in ]0, 1[ ...
AbstractBesides fractional Brownian motion most non-Gaussian fractional fields are obtained by integ...