We consider the drawdown and drawup of a fractional Brownian motion with trend, which corresponds to the logarithm of geometric fractional Brownian motion representing the stock price in a financial market. We derive the asymptotics of tail probabilities of the maximum drawdown and maximum drawup, respectively, as the threshold goes to infinity. It turns out that the extremes of drawdown lead to new scenarios of asymptotics depending on the Hurst index of fractional Brownian motion
Stock exchange dynamics of fractional order are usually modeled as a non-random exponential growth p...
We study drawdowns and rallies of Brownian motion. A rally is defined as the difference of the prese...
Let {X(t),t a parts per thousand yen 0} be a centered Gaussian process and let gamma be a non-negati...
We consider the drawdown and drawup of a fractional Brownian motion with trend, which corresponds to...
In this paper, we find bounds on the distribution of the maximum loss of fractional Brownian motion ...
The maximum drawdown at time T of a random process on [0,T] can be defined informally as the largest...
In the high-frequency limit, conditionally expected increments of fractional Brownian motion converg...
Define the incremental fractional Brownian field Z(H)(tau, S) = B-H (S+tau) By (S), H E (0, 1), wher...
none3siIn a market with an asset price described by fractional Brownian motion, which can be traded ...
In this paper, we derive a variation of the Azéma martingale using two approaches—a direct probabili...
Financial series may possess fractal dimensions which would induce cycles of many different duration...
The MDD is defined as the maximum loss incurred from peak to bottom during a specified period of tim...
We study drawdowns and rallies of Brownian motion. A rally is defined as the difference of the prese...
In this paper, we investigate the boundary non-crossing probabilities of a fractional Brownian motio...
AbstractThe drawdown process Y of a completely asymmetric Lévy process X is equal to X reflected at ...
Stock exchange dynamics of fractional order are usually modeled as a non-random exponential growth p...
We study drawdowns and rallies of Brownian motion. A rally is defined as the difference of the prese...
Let {X(t),t a parts per thousand yen 0} be a centered Gaussian process and let gamma be a non-negati...
We consider the drawdown and drawup of a fractional Brownian motion with trend, which corresponds to...
In this paper, we find bounds on the distribution of the maximum loss of fractional Brownian motion ...
The maximum drawdown at time T of a random process on [0,T] can be defined informally as the largest...
In the high-frequency limit, conditionally expected increments of fractional Brownian motion converg...
Define the incremental fractional Brownian field Z(H)(tau, S) = B-H (S+tau) By (S), H E (0, 1), wher...
none3siIn a market with an asset price described by fractional Brownian motion, which can be traded ...
In this paper, we derive a variation of the Azéma martingale using two approaches—a direct probabili...
Financial series may possess fractal dimensions which would induce cycles of many different duration...
The MDD is defined as the maximum loss incurred from peak to bottom during a specified period of tim...
We study drawdowns and rallies of Brownian motion. A rally is defined as the difference of the prese...
In this paper, we investigate the boundary non-crossing probabilities of a fractional Brownian motio...
AbstractThe drawdown process Y of a completely asymmetric Lévy process X is equal to X reflected at ...
Stock exchange dynamics of fractional order are usually modeled as a non-random exponential growth p...
We study drawdowns and rallies of Brownian motion. A rally is defined as the difference of the prese...
Let {X(t),t a parts per thousand yen 0} be a centered Gaussian process and let gamma be a non-negati...