In the paper "On Truncated Variation of Brownian Motion with Drift" (Bull. Pol. Acad. Sci. Math. 56 (2008), no.4, 267 - 281) we defined truncated variation of Brownian motion with drift, $W_t = B_t + \mu t, t\geq 0,$ where $(B_t)$ is a standard Brownian motion. Truncated variation differs from regular variation by neglecting jumps smaller than some fixed $c > 0$. We prove that truncated variation is a random variable with finite moment-generating function for any complex argument. We also define two closely related quantities - upward truncated variation and downward truncated variation. The defined quantities may have some interpretation in financial mathematics. Exponential moment of upward truncated variation may be interpreted as the ma...
In financial literature many have been the attempts to overcome the option pricing drawbacks that af...
The maximum drawdown at time T of a random process on [0,T] can be defined informally as the largest...
Wilfrid Kendall notes on the complexity of the paths of Brownian motion: If you run Brownian motion ...
AbstractThe truncated variation, TVc, is a fairly new concept introduced in Łochowski (2008) [5]. Ro...
Abstract. In the recent papers [8, 9, 10] the truncated variation has been introduced, characterized...
In this work we study drawdowns and drawups of general diffusion processes. The drawdown process is ...
AbstractWe provide a surprising new application of classical approximation theory to a fundamental a...
Investors are naturally interested in the supremum and the infimum of stock prices, also in the maxi...
Related to risk and to hedging investors would be interested insupremum, infimum, maximum ...
Modelling the asset returns distribution has been the focal point of modern finance for almost a cen...
Statistical inference for stochastic processes under high-frequency observations has been an active ...
We study a scaled version of a two-parameter Brownian penalization model introduced by Roynette-Vall...
Stochastic volatility and jumps are viewed as arising from Brownian subordination given here by an i...
A basic model in mathematical finance theory is the celebrated geometric Brownian motion. Moreover...
Abstract. A new Lévy motion with both continuous (Brownian) and discontin-uous (Laplace motion) com...
In financial literature many have been the attempts to overcome the option pricing drawbacks that af...
The maximum drawdown at time T of a random process on [0,T] can be defined informally as the largest...
Wilfrid Kendall notes on the complexity of the paths of Brownian motion: If you run Brownian motion ...
AbstractThe truncated variation, TVc, is a fairly new concept introduced in Łochowski (2008) [5]. Ro...
Abstract. In the recent papers [8, 9, 10] the truncated variation has been introduced, characterized...
In this work we study drawdowns and drawups of general diffusion processes. The drawdown process is ...
AbstractWe provide a surprising new application of classical approximation theory to a fundamental a...
Investors are naturally interested in the supremum and the infimum of stock prices, also in the maxi...
Related to risk and to hedging investors would be interested insupremum, infimum, maximum ...
Modelling the asset returns distribution has been the focal point of modern finance for almost a cen...
Statistical inference for stochastic processes under high-frequency observations has been an active ...
We study a scaled version of a two-parameter Brownian penalization model introduced by Roynette-Vall...
Stochastic volatility and jumps are viewed as arising from Brownian subordination given here by an i...
A basic model in mathematical finance theory is the celebrated geometric Brownian motion. Moreover...
Abstract. A new Lévy motion with both continuous (Brownian) and discontin-uous (Laplace motion) com...
In financial literature many have been the attempts to overcome the option pricing drawbacks that af...
The maximum drawdown at time T of a random process on [0,T] can be defined informally as the largest...
Wilfrid Kendall notes on the complexity of the paths of Brownian motion: If you run Brownian motion ...