The distribution of the Æ-quantile of a Brownian motion on an interval [0, t] has been obtained motivated by a problem in financial mathematics. In this paper we generalize these results by calculating an explicit expression for the joint density of the Æ-quantile of a standard Brownian motion, its first and last hitting times and the value of the process at time t. Our results can easily be generalized to a Brownian motion with drift. It is shown that the first and last hitting times follow a transformed arcsine law
Brownian Motion is one of the most useful tools in the arsenal of stochastic models. This phenomenon...
6 pages, 6 figuresInternational audienceThe three arcsine laws for Brownian motion are a cornerstone...
International audienceLet (S t) t≥0 be the running maximum of a standard Brownian motion (B t) t≥0 a...
The distribution of the Æ-quantile of a Brownian motion on an interval [0, t] has been obtained moti...
The distribution of the α-quantile of a Brownian motion on an interval [0, t] has been obtained moti...
Consider a stochastic process that lives on n-semiaxes emanating from a common origin. On each semia...
We consider lid Brownian motions, B(j)(t), where B(j)(0) has a rapidly decreasing, smooth density fu...
We consider iid Brownian motions, Bj(t), where Bj(0) has a rapidly decreasing, smooth density functi...
We consider a standard Brownian motion whose drift alternates randomly between a positive and a nega...
We obtain a closed formula for the Laplace transform of the first moment of certain exponential func...
We apply an Abelian theorem, due to Berg, to determine the asymptotic behaviour of as x2t-1-[gamma]'...
We present a perturbation theory extending a prescription due to Feynman for computing the probabili...
This work discusses Brownian motion and its basic transformations. The work describes basic properti...
A basic model in mathematical finance theory is the celebrated geometric Brownian motion. Moreover...
We consider the first-hitting time, \tau_ Y , of the linear boundary S(t) = a + bt by the process X...
Brownian Motion is one of the most useful tools in the arsenal of stochastic models. This phenomenon...
6 pages, 6 figuresInternational audienceThe three arcsine laws for Brownian motion are a cornerstone...
International audienceLet (S t) t≥0 be the running maximum of a standard Brownian motion (B t) t≥0 a...
The distribution of the Æ-quantile of a Brownian motion on an interval [0, t] has been obtained moti...
The distribution of the α-quantile of a Brownian motion on an interval [0, t] has been obtained moti...
Consider a stochastic process that lives on n-semiaxes emanating from a common origin. On each semia...
We consider lid Brownian motions, B(j)(t), where B(j)(0) has a rapidly decreasing, smooth density fu...
We consider iid Brownian motions, Bj(t), where Bj(0) has a rapidly decreasing, smooth density functi...
We consider a standard Brownian motion whose drift alternates randomly between a positive and a nega...
We obtain a closed formula for the Laplace transform of the first moment of certain exponential func...
We apply an Abelian theorem, due to Berg, to determine the asymptotic behaviour of as x2t-1-[gamma]'...
We present a perturbation theory extending a prescription due to Feynman for computing the probabili...
This work discusses Brownian motion and its basic transformations. The work describes basic properti...
A basic model in mathematical finance theory is the celebrated geometric Brownian motion. Moreover...
We consider the first-hitting time, \tau_ Y , of the linear boundary S(t) = a + bt by the process X...
Brownian Motion is one of the most useful tools in the arsenal of stochastic models. This phenomenon...
6 pages, 6 figuresInternational audienceThe three arcsine laws for Brownian motion are a cornerstone...
International audienceLet (S t) t≥0 be the running maximum of a standard Brownian motion (B t) t≥0 a...