In this work we gather several results we obtained on the behavior of the integral of linear Brownian motion, and more particularly on the various distributions related to the first passage times of the trajectories by fixed thresholds. For instance, we were able to explicitly determine the joint law of the couple made up of the first passage time of the integrated process by a fixed point and of the related location of Brownian motion. We retrieved in particular the marginal laws of this couple discovered by M. Goldman (1971) and Ju. P. Gor'kov (1975), as well as the law of the first return time to the origin obtained by H.P. McKean (1963). This result enabled us to resolve several open problems. In particular, we obtained the distribution...
A new computationally simple, speedy and accurate method is proposed to construct first-passage-time...
The first passage time (FPT) problem for Brownian motion has been extensively studied in the litera...
AbstractLet v be a bounded function with bounded support in Rd⩾ 3. Let x,yϵRd. Let Z(t) denote the p...
In this work we gather several results we obtained on the behavior of the integral of linear Brownia...
In this thesis, we study the distributional properties of functionals of the Brownian motion. The th...
Alili LarbiNovikov AlexanderSchweizer MartinYor MarcFrom both theoretical and applied perspectives, ...
The joint distribution of maximum increase and decrease for Brown-ian motion up to an independent ex...
Abstract. We study Brownian motion reflected on an “independent ” Brownian path. We prove results on...
We compute the joint distribution of the first times a linear diffusion makes an excursion longer th...
We study Brownian motion reflected on an "independent" Brownian path. We prove results on the joint ...
We derive, the joint probability density of the maximum), ( mtMP M and the time at which this maximu...
For drifted Brownian motion X(t) = x − μt + Bt (μ > 0) starting from x > 0, we study the joint dist...
The distribution of the Æ-quantile of a Brownian motion on an interval [0, t] has been obtained moti...
AbstractXt is a Brownian sheet defined for t belonging to the positive orthant of RN, for which the ...
AbstractExtending a path decomposition which is known to hold both for Brownian motion and random wa...
A new computationally simple, speedy and accurate method is proposed to construct first-passage-time...
The first passage time (FPT) problem for Brownian motion has been extensively studied in the litera...
AbstractLet v be a bounded function with bounded support in Rd⩾ 3. Let x,yϵRd. Let Z(t) denote the p...
In this work we gather several results we obtained on the behavior of the integral of linear Brownia...
In this thesis, we study the distributional properties of functionals of the Brownian motion. The th...
Alili LarbiNovikov AlexanderSchweizer MartinYor MarcFrom both theoretical and applied perspectives, ...
The joint distribution of maximum increase and decrease for Brown-ian motion up to an independent ex...
Abstract. We study Brownian motion reflected on an “independent ” Brownian path. We prove results on...
We compute the joint distribution of the first times a linear diffusion makes an excursion longer th...
We study Brownian motion reflected on an "independent" Brownian path. We prove results on the joint ...
We derive, the joint probability density of the maximum), ( mtMP M and the time at which this maximu...
For drifted Brownian motion X(t) = x − μt + Bt (μ > 0) starting from x > 0, we study the joint dist...
The distribution of the Æ-quantile of a Brownian motion on an interval [0, t] has been obtained moti...
AbstractXt is a Brownian sheet defined for t belonging to the positive orthant of RN, for which the ...
AbstractExtending a path decomposition which is known to hold both for Brownian motion and random wa...
A new computationally simple, speedy and accurate method is proposed to construct first-passage-time...
The first passage time (FPT) problem for Brownian motion has been extensively studied in the litera...
AbstractLet v be a bounded function with bounded support in Rd⩾ 3. Let x,yϵRd. Let Z(t) denote the p...