We apply the multilevel Monte Carlo method for option pricing problems using exponential Lévy models with a uniform timestep discretisation. For lookback and barrier options, we derive estimates of the convergence rate of the error introduced by the discrete monitoring of the running supremum of a broad class of Lévy processes. We then use these to obtain upper bounds on the multilevel Monte Carlo variance convergence rate for the Variance Gamma, NIG and a-stable processes. We also provide analysis of a trapezoidal approximation for Asian options. Our method is illustrated by numerical experiments
AbstractThis article introduces and analyzes multilevel Monte Carlo schemes for the evaluation of th...
Today, better numerical approximations are required for multi-dimensional SDEs to improve on the poo...
Summary. In this paper we show that the Milstein scheme can be used to improve the convergence of th...
We apply the multilevel Monte Carlo method for option pricing problems using exponential Lévy models...
This thesis consists of two parts. The first part (Chapters 2-4) considers multilevel Monte Carlo fo...
A standard problem in mathematical finance is the calculation of the price of some financial derivativ...
In Monte Carlo path simulations, which are used extensively in computational fi-nance, one is intere...
In this thesis, we center our research around the analytical approximation of American put options w...
This paper focuses on studying the multilevel Monte Carlo method recently introduced by Giles [8] an...
Monte Carlo path simulations are common in mathematical and computational finance as a way of estima...
In this work the approximation of Hilbert-space-valued random variables is combined with the approxi...
Monte Carlo is a simple and flexible tool that is widely used in computational finance. In this cont...
In this work the approximation of Hilbert-space-valued random variables is combined with the approxi...
Giles (Multilevel Monte Carlo path simulation Operations Research, 2008; 56:607-617) introduced a mu...
In Kuznetsov et al. (2011) a new Monte Carlo simulation technique was introduced for a large family ...
AbstractThis article introduces and analyzes multilevel Monte Carlo schemes for the evaluation of th...
Today, better numerical approximations are required for multi-dimensional SDEs to improve on the poo...
Summary. In this paper we show that the Milstein scheme can be used to improve the convergence of th...
We apply the multilevel Monte Carlo method for option pricing problems using exponential Lévy models...
This thesis consists of two parts. The first part (Chapters 2-4) considers multilevel Monte Carlo fo...
A standard problem in mathematical finance is the calculation of the price of some financial derivativ...
In Monte Carlo path simulations, which are used extensively in computational fi-nance, one is intere...
In this thesis, we center our research around the analytical approximation of American put options w...
This paper focuses on studying the multilevel Monte Carlo method recently introduced by Giles [8] an...
Monte Carlo path simulations are common in mathematical and computational finance as a way of estima...
In this work the approximation of Hilbert-space-valued random variables is combined with the approxi...
Monte Carlo is a simple and flexible tool that is widely used in computational finance. In this cont...
In this work the approximation of Hilbert-space-valued random variables is combined with the approxi...
Giles (Multilevel Monte Carlo path simulation Operations Research, 2008; 56:607-617) introduced a mu...
In Kuznetsov et al. (2011) a new Monte Carlo simulation technique was introduced for a large family ...
AbstractThis article introduces and analyzes multilevel Monte Carlo schemes for the evaluation of th...
Today, better numerical approximations are required for multi-dimensional SDEs to improve on the poo...
Summary. In this paper we show that the Milstein scheme can be used to improve the convergence of th...