We study some limit theorems for the normalized law of integrated Brownian motion perturbed by several examples of functionals: the first passage time, the nth passage time, the last passage time up to a finite horizon and the supremum. We show that the penalization principle holds in all these cases and give descriptions of the conditioned processes. In particular, it is remarkable that the penalization by the nth passage time is independent of n, and always gives the same penalized process, i.e. integrated Brownian motion conditioned not to hit 0. Our results rely on some explicit formulae obtained by Lachal and on enlargement of filtrations
AbstractThe local time of a Brownian motion can be constructed from its excursions. The normalised e...
Abstract. Suppose that g(t) and Wt are independent Brownian motions starting from g(0) = W0 = 0. Con...
In this work we gather several results we obtained on the behavior of the integral of linear Brownia...
We study some limit theorems for the normalized law of integrated Brownian motion perturbe...
As in preceding papers in which we studied the limits of penalized 1-dimensional Wiener measures wit...
AbstractWe penalise Brownian motion by a function of its one-sided supremum considered up to the las...
Abstract. We describe the limit laws, as t→∞, of a Bessel process (Rs, s ≤ t) of dimension d ∈ (0, 2...
regroupement de deux articlesIn the same vein as in preceding papers in which we studied the limits ...
We study the two-dimensional process of integrated Brownian motion and Brownian motion, where integr...
We study the 2-dimensional process of integrated Brownian motion and Brownian motion, where integrat...
Penalising a process is to modify its distribution with a limiting procedure, thus defining a new pr...
Penalising a process is to modify its distribution with a limiting procedure, thus defining a new pr...
Suppose that g(t) and Wt are independent Brownian motions starting from g(0) = W0 = 0. Consider the...
Let B = (Bt)t≥0 be a standard Brownian motion and let (Lxt; t ≥ 0, x ∈R) be a continuous version of ...
Let (Bt; t ≥ 0) be a Brownian motion process starting from B0 = ν and define Xν(t) = ∫ t 0 Bs ds. Fo...
AbstractThe local time of a Brownian motion can be constructed from its excursions. The normalised e...
Abstract. Suppose that g(t) and Wt are independent Brownian motions starting from g(0) = W0 = 0. Con...
In this work we gather several results we obtained on the behavior of the integral of linear Brownia...
We study some limit theorems for the normalized law of integrated Brownian motion perturbe...
As in preceding papers in which we studied the limits of penalized 1-dimensional Wiener measures wit...
AbstractWe penalise Brownian motion by a function of its one-sided supremum considered up to the las...
Abstract. We describe the limit laws, as t→∞, of a Bessel process (Rs, s ≤ t) of dimension d ∈ (0, 2...
regroupement de deux articlesIn the same vein as in preceding papers in which we studied the limits ...
We study the two-dimensional process of integrated Brownian motion and Brownian motion, where integr...
We study the 2-dimensional process of integrated Brownian motion and Brownian motion, where integrat...
Penalising a process is to modify its distribution with a limiting procedure, thus defining a new pr...
Penalising a process is to modify its distribution with a limiting procedure, thus defining a new pr...
Suppose that g(t) and Wt are independent Brownian motions starting from g(0) = W0 = 0. Consider the...
Let B = (Bt)t≥0 be a standard Brownian motion and let (Lxt; t ≥ 0, x ∈R) be a continuous version of ...
Let (Bt; t ≥ 0) be a Brownian motion process starting from B0 = ν and define Xν(t) = ∫ t 0 Bs ds. Fo...
AbstractThe local time of a Brownian motion can be constructed from its excursions. The normalised e...
Abstract. Suppose that g(t) and Wt are independent Brownian motions starting from g(0) = W0 = 0. Con...
In this work we gather several results we obtained on the behavior of the integral of linear Brownia...