Add to ORKG29 pagesGiven a process with independent increments $X$ (not necessarily a martingale) and a large class of square integrable r.v. $H=f(X_T)$, $f$ being the Fourier transform of a finite measure $\mu$, we provide explicit Kunita-Watanabe and Föllmer-Schweizer decompositions. The representation is expressed by means of two significant maps: the expectation and derivative operators related to the characteristics of $X$. We also provide an explicit expression for the variance optimal error when hedging the claim $H$ with underlying process $X$. Those questions are motivated by finding the solution of the celebrated problem of global and local quadratic risk minimization in mathematical finance
50 pagesWe introduce the notion of {\em covariance measure structure} for square integrable stochast...
The main goal of this thesis is to develop Malliavin Calculus for Lévy processes. This will be achie...
The stochastic integral representation for an arbitrary random variable in a standard $L_2$-space is...
29 pagesGiven a process with independent increments $X$ (not necessarily a martingale) and a large c...
29 pagesGiven a process with independent increments $X$ (not necessarily a martingale) and a large c...
29 pagesGiven a process with independent increments $X$ (not necessarily a martingale) and a large c...
Given a process with independent increments X (not necessarily a martingale) and a large class of sq...
We consider a Poisson process [eta] on a measurable space equipped with a strict partial ordering, a...
We study representations of a random variable $\xi$ as an integral of an adapted process with respec...
We consider a Poisson process $\eta$ on a measurable space $(\BY,\mathcal{Y})$ equipped with a parti...
AbstractWe consider a Poisson process η on a measurable space equipped with a strict partial orderin...
AbstractWe consider a Poisson process η on a measurable space equipped with a strict partial orderin...
50 pagesWe introduce the notion of {\em covariance measure structure} for square integrable stochast...
50 pagesWe introduce the notion of {\em covariance measure structure} for square integrable stochast...
50 pagesWe introduce the notion of {\em covariance measure structure} for square integrable stochast...
50 pagesWe introduce the notion of {\em covariance measure structure} for square integrable stochast...
The main goal of this thesis is to develop Malliavin Calculus for Lévy processes. This will be achie...
The stochastic integral representation for an arbitrary random variable in a standard $L_2$-space is...
29 pagesGiven a process with independent increments $X$ (not necessarily a martingale) and a large c...
29 pagesGiven a process with independent increments $X$ (not necessarily a martingale) and a large c...
29 pagesGiven a process with independent increments $X$ (not necessarily a martingale) and a large c...
Given a process with independent increments X (not necessarily a martingale) and a large class of sq...
We consider a Poisson process [eta] on a measurable space equipped with a strict partial ordering, a...
We study representations of a random variable $\xi$ as an integral of an adapted process with respec...
We consider a Poisson process $\eta$ on a measurable space $(\BY,\mathcal{Y})$ equipped with a parti...
AbstractWe consider a Poisson process η on a measurable space equipped with a strict partial orderin...
AbstractWe consider a Poisson process η on a measurable space equipped with a strict partial orderin...
50 pagesWe introduce the notion of {\em covariance measure structure} for square integrable stochast...
50 pagesWe introduce the notion of {\em covariance measure structure} for square integrable stochast...
50 pagesWe introduce the notion of {\em covariance measure structure} for square integrable stochast...
50 pagesWe introduce the notion of {\em covariance measure structure} for square integrable stochast...
The main goal of this thesis is to develop Malliavin Calculus for Lévy processes. This will be achie...
The stochastic integral representation for an arbitrary random variable in a standard $L_2$-space is...