Add to ORKGWe propose an unbiased Monte-Carlo estimator for E[g(X t 1 , · · · , X tn)], where X is a diffusion process defined by a multi-dimensional stochastic differential equation (SDE). The main idea is to start instead from a well-chosen simulatable SDE whose coefficients are updated at independent exponential times. Such a simulatable process can be viewed as a regime-switching SDE, or as a branching diffusion process with one single living particle at all times. In order to compensate for the change of the coefficients of the SDE, our main representation result relies on the automatic differentiation technique induced by Bismu-Elworthy-Li formula from Malliavin calculus, as exploited by Fournié et al. [14] for the simulation of the Greeks in fi...
International audienceThe aim of this paper is to introduce a new Monte Carlo method based on import...
International audienceNon-linear mixed models defined by stochastic differential equations (SDEs) ar...
The goal of this paper is to present a series of recent contributions arising in numerical probabili...
We propose an unbiased Monte-Carlo estimator for E[g(X t 1 , · · · , X tn)], where X is a diffusion ...
Stochastic differential equations (SDEs) or diffusions are continuous-valued continuous-time stochas...
In this paper, we present extensions of the exact simulation algorithm introduced by Beskos et al. (...
Computing expected values of functions involving extreme values of diffusion processes can find wide...
Stochastic differential equations (SDE) are a natural tool for modelling systems that are inherently...
We describe and implement a novel methodology for Monte Carlo simulation of one-dimensional killed d...
The methodological framework developed and reviewed in this article concerns the unbiased Monte Car...
: A new type of martingale estimating function is proposed for inference about classes of diffusion ...
This dissertation focuses on the simulation efficiency of the Markov process for two scenarios: Stoc...
We introduce a novel algorithm (JEA) to simulate exactly from a class of one-dimensional jump-diffus...
In this paper we investigate the efficiency of some simulation schemes for the numerical solution o...
This work consists of two separate parts. In the first part we extend the work on exact simulation o...
International audienceThe aim of this paper is to introduce a new Monte Carlo method based on import...
International audienceNon-linear mixed models defined by stochastic differential equations (SDEs) ar...
The goal of this paper is to present a series of recent contributions arising in numerical probabili...
We propose an unbiased Monte-Carlo estimator for E[g(X t 1 , · · · , X tn)], where X is a diffusion ...
Stochastic differential equations (SDEs) or diffusions are continuous-valued continuous-time stochas...
In this paper, we present extensions of the exact simulation algorithm introduced by Beskos et al. (...
Computing expected values of functions involving extreme values of diffusion processes can find wide...
Stochastic differential equations (SDE) are a natural tool for modelling systems that are inherently...
We describe and implement a novel methodology for Monte Carlo simulation of one-dimensional killed d...
The methodological framework developed and reviewed in this article concerns the unbiased Monte Car...
: A new type of martingale estimating function is proposed for inference about classes of diffusion ...
This dissertation focuses on the simulation efficiency of the Markov process for two scenarios: Stoc...
We introduce a novel algorithm (JEA) to simulate exactly from a class of one-dimensional jump-diffus...
In this paper we investigate the efficiency of some simulation schemes for the numerical solution o...
This work consists of two separate parts. In the first part we extend the work on exact simulation o...
International audienceThe aim of this paper is to introduce a new Monte Carlo method based on import...
International audienceNon-linear mixed models defined by stochastic differential equations (SDEs) ar...
The goal of this paper is to present a series of recent contributions arising in numerical probabili...