Motivated by recent studies of record statistics in relation to strongly correlated time series, we consider explicitly the drawdown time of a Lévy process, which is defined as the time since it last achieved its running maximum when observed over a fixed time period . We show that the density function of this drawdown time, in the case of a completely asymmetric jump process, may be factored as a function of t multiplied by a function of T − t. This extends a known result for the case of pure Brownian motion. We state the factors explicitly for the cases of exponential down-jumps with drift, and for the downward inverse Gaussian Lévy process with drift
International audienceThe question how the extremal values of a stochastic process achieved on diffe...
AbstractThe drawdown process Y of a completely asymmetric Lévy process X is equal to X reflected at ...
This paper studies drawdown and drawup processes in a general diffusion model. The main result is a ...
Motivated by recent studies of record statistics in relation to strongly correlated time series, we ...
The maximum drawdown at time T of a random process on [0,T] can be defined informally as the largest...
The distribution of the time at which Brownian motion with drift attains its maximum on a given inte...
The joint distribution of maximum increase and decrease for Brown-ian motion up to an independent ex...
In this work we study drawdowns and drawups of general diffusion processes. The drawdown process is ...
First, we give a closed-form formula for first passage time of a reflected Brownian motion with drif...
The drawdown process Y of a completely asymmetric Lévy process X is equal to X reflected at its runn...
We consider the last zero crossing time $T_{mu,t}$ of a Brownian motion, with drift $mu eq 0$, in ...
The joint distribution of the maximum loss and the maximum gain is obtained for a spectrally negativ...
We derive, the joint probability density of the maximum), ( mtMP M and the time at which this maximu...
Main text: 5 pages + 3 Figs, Supp. Mat.: 20 pages + 7 FigsInternational audienceWe present an exact ...
Distributional identities for a Lévy process Xt , its quadratic variation process Vt and its maximal...
International audienceThe question how the extremal values of a stochastic process achieved on diffe...
AbstractThe drawdown process Y of a completely asymmetric Lévy process X is equal to X reflected at ...
This paper studies drawdown and drawup processes in a general diffusion model. The main result is a ...
Motivated by recent studies of record statistics in relation to strongly correlated time series, we ...
The maximum drawdown at time T of a random process on [0,T] can be defined informally as the largest...
The distribution of the time at which Brownian motion with drift attains its maximum on a given inte...
The joint distribution of maximum increase and decrease for Brown-ian motion up to an independent ex...
In this work we study drawdowns and drawups of general diffusion processes. The drawdown process is ...
First, we give a closed-form formula for first passage time of a reflected Brownian motion with drif...
The drawdown process Y of a completely asymmetric Lévy process X is equal to X reflected at its runn...
We consider the last zero crossing time $T_{mu,t}$ of a Brownian motion, with drift $mu eq 0$, in ...
The joint distribution of the maximum loss and the maximum gain is obtained for a spectrally negativ...
We derive, the joint probability density of the maximum), ( mtMP M and the time at which this maximu...
Main text: 5 pages + 3 Figs, Supp. Mat.: 20 pages + 7 FigsInternational audienceWe present an exact ...
Distributional identities for a Lévy process Xt , its quadratic variation process Vt and its maximal...
International audienceThe question how the extremal values of a stochastic process achieved on diffe...
AbstractThe drawdown process Y of a completely asymmetric Lévy process X is equal to X reflected at ...
This paper studies drawdown and drawup processes in a general diffusion model. The main result is a ...