This thesis is concerned withapplications of Malliavin-like calculus for jump processes. In thefirst part, we compute lower bounds for the density of jumpdiffusions with a continuous part driven by a Brownian motion. Weuse a Malliavin conditional integration by parts formula based onBrownian increments only. We then deal with the computation offinancial options, when the asset price follows a pure jump process.In the second part, we develop an abstract calculus of the Malliavin type based on random variables which are not independent and have discontinuous conditional densities. We settle an integration by parts formula that we apply then to the jump times and amplitudes of pure jump processes. In the third part, we use this integration by ...
In this article, we derive expressions for conditional expectations in terms of regular expectations...
This paper presents an original probabilistic method for the numerical computations of Greeks (i.e. ...
This paper derives asymptotic expansion formulas for option prices and implied volatilities as well ...
This thesis is concerned withapplications of Malliavin-like calculus for jump processes. In thefirst...
Cette thèse donne deux applications du calcul de Malliavin pour les processus de sauts. Dans la prem...
We use the Malliavin calculus for Poisson processes in order to compute sensitivities for European o...
AbstractIn recent years efficient methods have been developed for calculating derivative price sensi...
In primo luogo è sviluppato un calcolo di Malliavin unificato in un contesto di tipo jump-diffusion...
Using the Malliavin calculus on Poisson space we compute Greeks in a market driven by a discontinuou...
Dans cette thèse nous appliquons le calcul de Malliavin afin d’obtenir la propriété de normalité asy...
La première partie est consacrée au contrôle optimal stochastique et impulsionnel. Nous proposons de...
This paper is the sequel of Part I [1], where we showed how to use the so-called Malliavin calculus ...
In this thesis we apply the Malliavin calculus in order to obtain the local asymptotic normality (LA...
Abstract. We consider a Lévy process Xt and the solution Yt of a stochastic differential equation d...
Logarithmic derivatives of density functions are equivalent to the Greeks computations for asset pri...
In this article, we derive expressions for conditional expectations in terms of regular expectations...
This paper presents an original probabilistic method for the numerical computations of Greeks (i.e. ...
This paper derives asymptotic expansion formulas for option prices and implied volatilities as well ...
This thesis is concerned withapplications of Malliavin-like calculus for jump processes. In thefirst...
Cette thèse donne deux applications du calcul de Malliavin pour les processus de sauts. Dans la prem...
We use the Malliavin calculus for Poisson processes in order to compute sensitivities for European o...
AbstractIn recent years efficient methods have been developed for calculating derivative price sensi...
In primo luogo è sviluppato un calcolo di Malliavin unificato in un contesto di tipo jump-diffusion...
Using the Malliavin calculus on Poisson space we compute Greeks in a market driven by a discontinuou...
Dans cette thèse nous appliquons le calcul de Malliavin afin d’obtenir la propriété de normalité asy...
La première partie est consacrée au contrôle optimal stochastique et impulsionnel. Nous proposons de...
This paper is the sequel of Part I [1], where we showed how to use the so-called Malliavin calculus ...
In this thesis we apply the Malliavin calculus in order to obtain the local asymptotic normality (LA...
Abstract. We consider a Lévy process Xt and the solution Yt of a stochastic differential equation d...
Logarithmic derivatives of density functions are equivalent to the Greeks computations for asset pri...
In this article, we derive expressions for conditional expectations in terms of regular expectations...
This paper presents an original probabilistic method for the numerical computations of Greeks (i.e. ...
This paper derives asymptotic expansion formulas for option prices and implied volatilities as well ...