First, we give a closed-form formula for first passage time of a reflected Brownian motion with drift. This corrects a formula by Perry et al. (2004). Second, we show that the maximum before a fixed drawdown is exponentially distributed for any drawdown, if and only if the diffusion characteristic m/s2 is constant. This complements the sufficient condition formulated by Lehoczky (1977). Third, we give an alternative proof for the fact that the maximum before a fixed drawdown is exponentially distributed for any spectrally negative Lévy process, a result due to Mijatovi´c and Pistorius (2012). Our proof is similar, but simpler than Lehoczky (1977) or Landriault et al. (2017)
Considering a diffusion $X$ mean reverting to 0 {and starting at $X_0>0$}, we study the control prob...
We compute the joint distribution of the first times a linear diffusion makes an excursion longer th...
The problem of the quickest detection of a change in the drift of a time-homogeneous diffusion proce...
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...
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 the running maximu...
In this work we study drawdowns and drawups of general diffusion processes. The drawdown process is ...
The maximum drawdown at time T of a random process on [0,T] can be defined informally as the largest...
We obtain closed-form expressions for the value of the joint Laplace transform of therunning maximum...
We consider the problem of finding a stopping time that minimises the L 1-distance to θ, the time at...
Given a spectrally negative Lévy process, we predict, in an $L_1$ sense, the last passage time of th...
Motivated by recent studies of record statistics in relation to strongly correlated time series, we ...
We obtain closed-form expressions for the values of joint Laplace transforms of the running maximum ...
Given a spectrally negative L\'evy process $X$ drifting to infinity, (inspired on the early ideas of...
Considering a diffusion $X$ mean reverting to 0 {and starting at $X_0>0$}, we study the control prob...
We compute the joint distribution of the first times a linear diffusion makes an excursion longer th...
The problem of the quickest detection of a change in the drift of a time-homogeneous diffusion proce...
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...
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 the running maximu...
In this work we study drawdowns and drawups of general diffusion processes. The drawdown process is ...
The maximum drawdown at time T of a random process on [0,T] can be defined informally as the largest...
We obtain closed-form expressions for the value of the joint Laplace transform of therunning maximum...
We consider the problem of finding a stopping time that minimises the L 1-distance to θ, the time at...
Given a spectrally negative Lévy process, we predict, in an $L_1$ sense, the last passage time of th...
Motivated by recent studies of record statistics in relation to strongly correlated time series, we ...
We obtain closed-form expressions for the values of joint Laplace transforms of the running maximum ...
Given a spectrally negative L\'evy process $X$ drifting to infinity, (inspired on the early ideas of...
Considering a diffusion $X$ mean reverting to 0 {and starting at $X_0>0$}, we study the control prob...
We compute the joint distribution of the first times a linear diffusion makes an excursion longer th...
The problem of the quickest detection of a change in the drift of a time-homogeneous diffusion proce...