AbstractThis paper is devoted to analyzing several properties of the bifractional Brownian motion introduced by Houdré and Villa. This process is a self-similar Gaussian process depending on two parameters H and K and it constitutes a natural generalization of fractional Brownian motion (which is obtained for K=1). Here, we adopt the strategy of stochastic calculus via regularization. Of particular interest to us is the case HK=12. In this case, the process is a finite quadratic variation process with bracket equal to a constant times t and it has the same order of self-similarity as standard Brownian motion. It is a short-memory process even though it is neither a semimartingale nor a Dirichlet process
Self-similar stochastic processes are used for stochastic modeling whenever it is expected that long...
We study the regularity of stochastic current defined as Skorohod integral with respect to bifractio...
The partial derivatives with respect to time and the fractional Brown-ian motion of a particular cla...
This paper is devoted to analyze several properties of the bifractional Brownian motion introduced b...
This paper is devoted to analyze several properties of the bifractional Brownian motion introduced b...
AbstractThis paper is devoted to analyzing several properties of the bifractional Brownian motion in...
In this paper we introduce and study a self-similar Gaussian process that is the bifractional Browni...
We study several properties of the sub-fractional Brownian motion introduced by Bojdecki, Gorostiza ...
International audienceIn this paper we introduce and study a self-similar Gaussian process that is t...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
AbstractThe multifractional Brownian motion (MBM) processes are locally self-similar Gaussian proces...
Let B=Bt1,…,Btdt≥0 be a d-dimensional bifractional Brownian motion and Rt=Bt12+⋯+Btd2 be the bifract...
http://projecteuclid.org/euclid.bj/1194625601International audienceLet BH, K={BH, K(t), t \in R +} b...
Fractional Brownian motion is a nontrivial generalization of standard Brownian motion (Wie- ner proc...
In this article we will present a new perspective on the variable order fractional calculus, which a...
Self-similar stochastic processes are used for stochastic modeling whenever it is expected that long...
We study the regularity of stochastic current defined as Skorohod integral with respect to bifractio...
The partial derivatives with respect to time and the fractional Brown-ian motion of a particular cla...
This paper is devoted to analyze several properties of the bifractional Brownian motion introduced b...
This paper is devoted to analyze several properties of the bifractional Brownian motion introduced b...
AbstractThis paper is devoted to analyzing several properties of the bifractional Brownian motion in...
In this paper we introduce and study a self-similar Gaussian process that is the bifractional Browni...
We study several properties of the sub-fractional Brownian motion introduced by Bojdecki, Gorostiza ...
International audienceIn this paper we introduce and study a self-similar Gaussian process that is t...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
AbstractThe multifractional Brownian motion (MBM) processes are locally self-similar Gaussian proces...
Let B=Bt1,…,Btdt≥0 be a d-dimensional bifractional Brownian motion and Rt=Bt12+⋯+Btd2 be the bifract...
http://projecteuclid.org/euclid.bj/1194625601International audienceLet BH, K={BH, K(t), t \in R +} b...
Fractional Brownian motion is a nontrivial generalization of standard Brownian motion (Wie- ner proc...
In this article we will present a new perspective on the variable order fractional calculus, which a...
Self-similar stochastic processes are used for stochastic modeling whenever it is expected that long...
We study the regularity of stochastic current defined as Skorohod integral with respect to bifractio...
The partial derivatives with respect to time and the fractional Brown-ian motion of a particular cla...