The multilevel Monte Carlo algorithm is an extension of the traditional Monte Carlo algorithm. It is a numerical method, which allows us to approximate the expected value of a random variable X. We use some appropriate discretization method to obtain approximations X_1, X_2, ... ,X_L of X such that each approximation is made with a finer grid. The more accuracy we want from our approximation, the more the computational cost grows. The multilevel method exploits evaluation at multiple levels of refining discretizations allowing us to achieve a better accuracy with lower cost. In this thesis we use the Euler scheme to approximate the solution of the stochastic differential equation, and then we use the multilevel Monte Carlo algorithm to est...
Monte Carlo methods are a very general and useful approach for the estima-tion of expectations arisi...
Abstract. Discrete approximations to solutions of stochastic differential equations are well-known t...
Since its formulation in the late 1940s, the Feynman-Kac formula has proven to be an effective tool ...
We consider the problem of numerically estimating expectations of solutions to stochastic differenti...
AbstractThis article introduces and analyzes multilevel Monte Carlo schemes for the evaluation of th...
In this paper we introduce a new multilevel Monte Carlo (MLMC) estimator for multi-dimensional SDEs ...
A standard problem in the field of computational finance is that of pricing derivative securities. T...
Abstract. We present an adaptive multilevel Monte Carlo (MLMC) method for weak approximations of sol...
Abstract In this paper we develop antithetic multilevel Monte Carlo (MLMC) esti-mators for multidime...
Abstract. Stochastic collocation methods for approximating the solution of partial differential equa...
We show that multigrid ideas can be used to reduce the computational complexity of estimating an exp...
We investigate the extension of the multilevel Monte Carlo path simulation method to jump-diffusion ...
This work generalizes a multilevel Monte Carlo (MLMC) method in-troduced in [7] for the approximatio...
In this work, the approximation of Hilbert-space-valued random variables is combined with the approx...
Numerical methods for stochastic differential equations are relatively inefficient when used to appr...
Monte Carlo methods are a very general and useful approach for the estima-tion of expectations arisi...
Abstract. Discrete approximations to solutions of stochastic differential equations are well-known t...
Since its formulation in the late 1940s, the Feynman-Kac formula has proven to be an effective tool ...
We consider the problem of numerically estimating expectations of solutions to stochastic differenti...
AbstractThis article introduces and analyzes multilevel Monte Carlo schemes for the evaluation of th...
In this paper we introduce a new multilevel Monte Carlo (MLMC) estimator for multi-dimensional SDEs ...
A standard problem in the field of computational finance is that of pricing derivative securities. T...
Abstract. We present an adaptive multilevel Monte Carlo (MLMC) method for weak approximations of sol...
Abstract In this paper we develop antithetic multilevel Monte Carlo (MLMC) esti-mators for multidime...
Abstract. Stochastic collocation methods for approximating the solution of partial differential equa...
We show that multigrid ideas can be used to reduce the computational complexity of estimating an exp...
We investigate the extension of the multilevel Monte Carlo path simulation method to jump-diffusion ...
This work generalizes a multilevel Monte Carlo (MLMC) method in-troduced in [7] for the approximatio...
In this work, the approximation of Hilbert-space-valued random variables is combined with the approx...
Numerical methods for stochastic differential equations are relatively inefficient when used to appr...
Monte Carlo methods are a very general and useful approach for the estima-tion of expectations arisi...
Abstract. Discrete approximations to solutions of stochastic differential equations are well-known t...
Since its formulation in the late 1940s, the Feynman-Kac formula has proven to be an effective tool ...