This paper focuses on studying the multilevel Monte Carlo method recently introduced by Giles [8] and significantly more efficient than the classical Monte Carlo one. Our aim is to prove a central limit theorem of Lindeberg Feller type for the multilevel Monte Carlo method associated to the Euler discretization scheme. To do so, we prove first a stable law convergence theorem, in the spirit of Jacod and Protter [15], for the Euler scheme error on two consecutive levels of the algorithm. This leads to an accurate description of the optimal choice of parameters and to an explicit characterization of the limiting variance in the central limit theorem of the algorithm. We investigate the application of the Multilevel Monte Carlo method to the p...
Summary. In this paper we show that the Milstein scheme can be used to improve the convergence of th...
In this work the approximation of Hilbert-space-valued random variables is combined with the approxi...
In this work, the approximation of Hilbert-space-valued random variables is combined with the approx...
This paper focuses on studying the multilevel Monte Carlo method recently introduced by Giles [8] an...
Published in at http://dx.doi.org/10.1214/13-AAP993 the Annals of Applied Probability (http://www.im...
A standard problem in mathematical finance is the calculation of the price of some financial derivativ...
We apply the multilevel Monte Carlo method for option pricing problems using exponential Lévy models...
Monte Carlo path simulations are common in mathematical and computational finance as a way of estima...
In this thesis, we are interested in studying the combination of variance reduction methods and comp...
This thesis consists of two parts. The first part (Chapters 2-4) considers multilevel Monte Carlo fo...
The Euler–Maruyama scheme is known to diverge strongly and numerically weakly when applied to nonlin...
Giles (Multilevel Monte Carlo path simulation Operations Research, 2008; 56:607-617) introduced a mu...
In this paper we show that the Milstein scheme can be used to improve the convergence of the multile...
24 pages, 1 figureThis paper focuses on the study of an original combination of the Multilevel Monte...
Summary. In this paper we show that the Milstein scheme can be used to improve the convergence of th...
In this work the approximation of Hilbert-space-valued random variables is combined with the approxi...
In this work, the approximation of Hilbert-space-valued random variables is combined with the approx...
This paper focuses on studying the multilevel Monte Carlo method recently introduced by Giles [8] an...
Published in at http://dx.doi.org/10.1214/13-AAP993 the Annals of Applied Probability (http://www.im...
A standard problem in mathematical finance is the calculation of the price of some financial derivativ...
We apply the multilevel Monte Carlo method for option pricing problems using exponential Lévy models...
Monte Carlo path simulations are common in mathematical and computational finance as a way of estima...
In this thesis, we are interested in studying the combination of variance reduction methods and comp...
This thesis consists of two parts. The first part (Chapters 2-4) considers multilevel Monte Carlo fo...
The Euler–Maruyama scheme is known to diverge strongly and numerically weakly when applied to nonlin...
Giles (Multilevel Monte Carlo path simulation Operations Research, 2008; 56:607-617) introduced a mu...
In this paper we show that the Milstein scheme can be used to improve the convergence of the multile...
24 pages, 1 figureThis paper focuses on the study of an original combination of the Multilevel Monte...
Summary. In this paper we show that the Milstein scheme can be used to improve the convergence of th...
In this work the approximation of Hilbert-space-valued random variables is combined with the approxi...
In this work, the approximation of Hilbert-space-valued random variables is combined with the approx...