We obtain closed-form expressions for the value of the joint Laplace transform of the running maximum and minimum of a diffusion-type process stopped at the first time at which the associated drawdown or drawup process hits a constant level before an inde- pendent exponential random time. It is assumed that the coefficients of the diffusion-type process are regular functions of the current values of its running maximum and minimum. The proof is based on the solution to the equivalent inhomogeneous ordinary differential boundary-value problem and the application of the normal-reflection conditions for the value function at the edges of the state space of the resulting three-dimensional Markov process. The result is related to the computation...
AbstractWe consider a process (Xt(α))t∈[0,T) given by the SDE dXt(α)=αb(t)Xt(α)dt+σ(t)dBt, t∈[0,T), ...
Alili LarbiNovikov AlexanderSchweizer MartinYor MarcFrom both theoretical and applied perspectives, ...
Abstract In this paper we examine the probabilistic behavior of two quantities closely related to ma...
We obtain closed-form expressions for the value of the joint Laplace transform of the running maximu...
We obtain closed-form expressions for the value of the joint Laplace transform of therunning maximum...
We obtain closed-form expressions for the values of joint Laplace transforms of the running maximum ...
In this work we study drawdowns and drawups of general diffusion processes. The drawdown process is ...
This paper studies drawdown and drawup processes in a general diffusion model. The main result is a ...
AbstractThis paper studies drawdown and drawup processes in a general diffusion model. The main resu...
First, we give a closed-form formula for first passage time of a reflected Brownian motion with drif...
We compute some functionals related to the joint generalised Laplace transforms of the first times a...
We compute the Laplace transforms of the first exit times for certain one-dimensional jump–diffusion...
We investigate the exit times from an interval for a general one-dimensional time-homogeneous diffus...
We compute some functionals related to the generalized joint Laplace transforms of the first times a...
In this paper we establish a formula for the joint Laplace-Stieltjes transform of a reflected Lévy p...
AbstractWe consider a process (Xt(α))t∈[0,T) given by the SDE dXt(α)=αb(t)Xt(α)dt+σ(t)dBt, t∈[0,T), ...
Alili LarbiNovikov AlexanderSchweizer MartinYor MarcFrom both theoretical and applied perspectives, ...
Abstract In this paper we examine the probabilistic behavior of two quantities closely related to ma...
We obtain closed-form expressions for the value of the joint Laplace transform of the running maximu...
We obtain closed-form expressions for the value of the joint Laplace transform of therunning maximum...
We obtain closed-form expressions for the values of joint Laplace transforms of the running maximum ...
In this work we study drawdowns and drawups of general diffusion processes. The drawdown process is ...
This paper studies drawdown and drawup processes in a general diffusion model. The main result is a ...
AbstractThis paper studies drawdown and drawup processes in a general diffusion model. The main resu...
First, we give a closed-form formula for first passage time of a reflected Brownian motion with drif...
We compute some functionals related to the joint generalised Laplace transforms of the first times a...
We compute the Laplace transforms of the first exit times for certain one-dimensional jump–diffusion...
We investigate the exit times from an interval for a general one-dimensional time-homogeneous diffus...
We compute some functionals related to the generalized joint Laplace transforms of the first times a...
In this paper we establish a formula for the joint Laplace-Stieltjes transform of a reflected Lévy p...
AbstractWe consider a process (Xt(α))t∈[0,T) given by the SDE dXt(α)=αb(t)Xt(α)dt+σ(t)dBt, t∈[0,T), ...
Alili LarbiNovikov AlexanderSchweizer MartinYor MarcFrom both theoretical and applied perspectives, ...
Abstract In this paper we examine the probabilistic behavior of two quantities closely related to ma...