A filtered process $X^k$ is defined as an integral of a deterministic kernel $k$ with respect to a stochastic process $X$. One of the main problems to deal with such processes is to define a stochastic integral with respect to them. When $X$ is a Brownian motion one can use the Gaussian properties of $X^k$ to define an integral intrinsically. When $X$ is a jump process or a Levy process, this is not possible. Alternatively, we can use the integrals defined by means of the so called $\mathcal{S}$-transform or by means of the integral with respect to the process $X$ and a linear operator $\mathcal{K}$ constructed from $k$. The usual fact that even for predictable $Y$, $K^{\ast}(Y)$ may not be predictable forces us to consider only anticipativ...
Stochastic integration with respect to Gaussian processes, such as fractional Brownian motion (fBm) ...
The stochastic integral representation for an arbitrary random variable in a standard $L_2$-space is...
International audienceA stochastic calculus similar to Malliavin's calculus is worked out for Browni...
International audienceA filtered process X k is defined as an integral of a deterministic kernel k w...
A filtered process $X^k$ is defined as an integral of a deterministic kernel $k$ with respect to a s...
A stochastic integral of Banach space valued deterministic functions with respect to Banach space va...
AbstractA stochastic integral of Banach space valued deterministic functions with respect to Banach ...
International audienceWe construct the basis of a stochastic calculus for a new class of processes: ...
Let wt te [0,1], be a standard, Ft-adapted Brownian motion. Let xt be another, not necessarily adapt...
We define a stochastic anticipating integral µ with respect to Brownian motion, associated to a non ...
Let $L$ be a Levy process on $[0,+\infty)$. In particular cases, when $L$ is a Wiener or Poisson pro...
Stochastic Integrals Driven by Isonormal Gaussian Processes and Applications Master Thesis - Petr Čo...
We construct the basis of a stochastic calculus for a new class of processes: filtered Poisson proce...
This thesis deals with the stochastic integral with respect to Gaussian processes, which can be expr...
A stochastic integral of Banach space valued deterministic functions with respect to Banach space va...
Stochastic integration with respect to Gaussian processes, such as fractional Brownian motion (fBm) ...
The stochastic integral representation for an arbitrary random variable in a standard $L_2$-space is...
International audienceA stochastic calculus similar to Malliavin's calculus is worked out for Browni...
International audienceA filtered process X k is defined as an integral of a deterministic kernel k w...
A filtered process $X^k$ is defined as an integral of a deterministic kernel $k$ with respect to a s...
A stochastic integral of Banach space valued deterministic functions with respect to Banach space va...
AbstractA stochastic integral of Banach space valued deterministic functions with respect to Banach ...
International audienceWe construct the basis of a stochastic calculus for a new class of processes: ...
Let wt te [0,1], be a standard, Ft-adapted Brownian motion. Let xt be another, not necessarily adapt...
We define a stochastic anticipating integral µ with respect to Brownian motion, associated to a non ...
Let $L$ be a Levy process on $[0,+\infty)$. In particular cases, when $L$ is a Wiener or Poisson pro...
Stochastic Integrals Driven by Isonormal Gaussian Processes and Applications Master Thesis - Petr Čo...
We construct the basis of a stochastic calculus for a new class of processes: filtered Poisson proce...
This thesis deals with the stochastic integral with respect to Gaussian processes, which can be expr...
A stochastic integral of Banach space valued deterministic functions with respect to Banach space va...
Stochastic integration with respect to Gaussian processes, such as fractional Brownian motion (fBm) ...
The stochastic integral representation for an arbitrary random variable in a standard $L_2$-space is...
International audienceA stochastic calculus similar to Malliavin's calculus is worked out for Browni...