http://projecteuclid.org/euclid.bj/1194625601International audienceLet BH, K={BH, K(t), t \in R +} be a bifractional Brownian motion in R d. We prove that BH, K is strongly locally non-deterministic. Applying this property and a stochastic integral representation of BH, K, we establish Chung's law of the iterated logarithm for BH, K, as well as sharp Hölder conditions and tail probability estimates for the local times of BH, K. We also consider the existence and regularity of the local times of the multiparameter bifractional Brownian motion BH̅, K̅={BH̅, K̅(t), t \in R +N} in R d using the Wiener–Itô chaos expansion
International audienceMultifractional processes are stochastic processes with non-stationary increme...
Let B=Bt1,…,Btdt≥0 be a d-dimensional bifractional Brownian motion and Rt=Bt12+⋯+Btd2 be the bifract...
In this paper we introduce and study a self-similar Gaussian process that is the bifractional Browni...
http://projecteuclid.org/euclid.bj/1194625601International audienceLet BH, K={BH, K(t), t \in R +} 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...
Estimates for the local and uniform moduli of continuity of the local time of the multifractional Br...
International audienceIn this paper we introduce and study a self-similar Gaussian process that is t...
This paper is devoted to analyze several properties of the bifractional Brownian motion introduced b...
AbstractThe multifractional Brownian motion (MBM) processes are locally self-similar Gaussian proces...
International audienceVarious paths properties of a stochastic process are obtained under mild condi...
International audienceLet $B^{H,K}=\left (B^{H,K}_{t}, t\geq 0\right )$ be a bifractional Brownian m...
summary:Let $B^{H_{i},K_i}=\{B^{H_{i},K_i}_t, t\geq 0 \}$, $i=1,2$ be two independent, $d$-dimensio...
AbstractLet WH={WH(t),t∈R} be a fractional Brownian motion of Hurst index H∈(0,1) with values in R, ...
Bifractional Brownian motion (bfBm) is a centered Gaussian process with covariance \[ R^{(H,K)}(...
International audienceMultifractional processes are stochastic processes with non-stationary increme...
Let B=Bt1,…,Btdt≥0 be a d-dimensional bifractional Brownian motion and Rt=Bt12+⋯+Btd2 be the bifract...
In this paper we introduce and study a self-similar Gaussian process that is the bifractional Browni...
http://projecteuclid.org/euclid.bj/1194625601International audienceLet BH, K={BH, K(t), t \in R +} 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...
Estimates for the local and uniform moduli of continuity of the local time of the multifractional Br...
International audienceIn this paper we introduce and study a self-similar Gaussian process that is t...
This paper is devoted to analyze several properties of the bifractional Brownian motion introduced b...
AbstractThe multifractional Brownian motion (MBM) processes are locally self-similar Gaussian proces...
International audienceVarious paths properties of a stochastic process are obtained under mild condi...
International audienceLet $B^{H,K}=\left (B^{H,K}_{t}, t\geq 0\right )$ be a bifractional Brownian m...
summary:Let $B^{H_{i},K_i}=\{B^{H_{i},K_i}_t, t\geq 0 \}$, $i=1,2$ be two independent, $d$-dimensio...
AbstractLet WH={WH(t),t∈R} be a fractional Brownian motion of Hurst index H∈(0,1) with values in R, ...
Bifractional Brownian motion (bfBm) is a centered Gaussian process with covariance \[ R^{(H,K)}(...
International audienceMultifractional processes are stochastic processes with non-stationary increme...
Let B=Bt1,…,Btdt≥0 be a d-dimensional bifractional Brownian motion and Rt=Bt12+⋯+Btd2 be the bifract...
In this paper we introduce and study a self-similar Gaussian process that is the bifractional Browni...