Tyt. z nagłówka.Bibliogr. s. 415-416.Given a Gaussian stationary increment processes, we show that a Skorokhod-Hitsuda stochastic integral with respect to this process, which obeys the Wick-Itô calculus rules, can be naturally defined using ideas taken from Hida’s white noise space theory. We use the Bochner-Minlos theorem to associate a probability space to the process, and define the counterpart of the S-transform in this space. We then use this transform to define the stochastic integral and prove an associated Itô formula.Dostępny również w formie drukowanej.KEYWORDS: stochastic integral, white noise space, fractional Brownian motion
The main notions and tools from white noise analysis are set up on the basis of the calculus of Gaus...
International audienceIn this paper, we define a stochastic calculus with respect to the Rosenblatt ...
We study a family of stationary increment Gaussian processes, indexed by time. These processes are d...
Given a Gaussian stationary increment processes, we show that a Skorokhod-Hitsuda stochastic integra...
Given a Gaussian stationary increment processes, we show that a Skorokhod-Hitsuda stochastic integra...
Using the white noise space setting, we define and study stochastic integrals with respect to a clas...
Stochastic integration with respect to Gaussian processes, such as fractional Brownian motion (fBm) ...
Using the white noise space setting, we define and study stochastic integrals with respect to a clas...
AbstractUsing the white noise space framework, we construct and study a class of Gaussian processes ...
Using the white noise space framework, we construct and study a class of Gaussian processes with sta...
Stochastic integration \textit{wrt} Gaussian processes has raised strong interest in recent years, m...
White noise is often regarded as the informal nonexistent derivative B˙(t) of a Brownian motion B˙(t...
International audienceStochastic integration with respect to Gaussian processes has raised strong in...
AbstractWe study a family of stationary increment Gaussian processes, indexed by time. These process...
We introduce the concept of functional process and consider the stochastic boundary value problem an...
The main notions and tools from white noise analysis are set up on the basis of the calculus of Gaus...
International audienceIn this paper, we define a stochastic calculus with respect to the Rosenblatt ...
We study a family of stationary increment Gaussian processes, indexed by time. These processes are d...
Given a Gaussian stationary increment processes, we show that a Skorokhod-Hitsuda stochastic integra...
Given a Gaussian stationary increment processes, we show that a Skorokhod-Hitsuda stochastic integra...
Using the white noise space setting, we define and study stochastic integrals with respect to a clas...
Stochastic integration with respect to Gaussian processes, such as fractional Brownian motion (fBm) ...
Using the white noise space setting, we define and study stochastic integrals with respect to a clas...
AbstractUsing the white noise space framework, we construct and study a class of Gaussian processes ...
Using the white noise space framework, we construct and study a class of Gaussian processes with sta...
Stochastic integration \textit{wrt} Gaussian processes has raised strong interest in recent years, m...
White noise is often regarded as the informal nonexistent derivative B˙(t) of a Brownian motion B˙(t...
International audienceStochastic integration with respect to Gaussian processes has raised strong in...
AbstractWe study a family of stationary increment Gaussian processes, indexed by time. These process...
We introduce the concept of functional process and consider the stochastic boundary value problem an...
The main notions and tools from white noise analysis are set up on the basis of the calculus of Gaus...
International audienceIn this paper, we define a stochastic calculus with respect to the Rosenblatt ...
We study a family of stationary increment Gaussian processes, indexed by time. These processes are d...