25 pagesWe present a parallel algorithm for solving backward stochastic differential equations (BSDEs in short) which are very useful theoretic tools to deal with many financial problems ranging from option pricing option to risk management. Our algorithm based on Gobet and Labart (2010) exploits the link between BSDEs and non linear partial differential equations (PDEs in short) and hence enables to solve high dimensional non linear PDEs. In this work, we apply it to the pricing and hedging of American options in high dimensional local volatility models, which remains very computationally demanding. We have tested our algorithm up to dimension 10 on a cluster of 512 CPUs and we obtained linear speedups which proves the scalability of our i...
We present a parallel implementation of the optimal quantization method on a grid computing. Its pur...
There is the need for applying numerical methods to problems that cannot be solved analytically and ...
Handling multidimensional parabolic linear, nonlinear and linear inverse problems is the main object...
25 pagesWe present a parallel algorithm for solving backward stochastic differential equations (BSDE...
International audienceWe present a parallel algorithm for solving backward stochastic differential e...
International audienceThis paper deals with the numerical solution of financial applications, more s...
In this project, we are aiming to solve option pricing and hedging problems numerically via Backward...
In this paper, we design a novel algorithm based on Least-Squares Monte Carlo (LSMC) in order to app...
The pricing of American style and multiple exercise options is a very challenging problem in mathema...
This thesis describes the development of efficient numerical solvers for a wide range of nonlinear o...
De ce fait, le premier objectif de notre travail consiste à proposer des générateurs de nombres aléa...
International audienceWe study an algorithm which has been proposed by Chinesta et al. to solve high...
The famous Black-Scholes formula provided the first mathematically sound mechanism to price financia...
The finance industry is beginning to adopt parallel computing for numerical computation, and will so...
International audienceIn this paper we present two parallel Monte Carlo based algorithms for pricing...
We present a parallel implementation of the optimal quantization method on a grid computing. Its pur...
There is the need for applying numerical methods to problems that cannot be solved analytically and ...
Handling multidimensional parabolic linear, nonlinear and linear inverse problems is the main object...
25 pagesWe present a parallel algorithm for solving backward stochastic differential equations (BSDE...
International audienceWe present a parallel algorithm for solving backward stochastic differential e...
International audienceThis paper deals with the numerical solution of financial applications, more s...
In this project, we are aiming to solve option pricing and hedging problems numerically via Backward...
In this paper, we design a novel algorithm based on Least-Squares Monte Carlo (LSMC) in order to app...
The pricing of American style and multiple exercise options is a very challenging problem in mathema...
This thesis describes the development of efficient numerical solvers for a wide range of nonlinear o...
De ce fait, le premier objectif de notre travail consiste à proposer des générateurs de nombres aléa...
International audienceWe study an algorithm which has been proposed by Chinesta et al. to solve high...
The famous Black-Scholes formula provided the first mathematically sound mechanism to price financia...
The finance industry is beginning to adopt parallel computing for numerical computation, and will so...
International audienceIn this paper we present two parallel Monte Carlo based algorithms for pricing...
We present a parallel implementation of the optimal quantization method on a grid computing. Its pur...
There is the need for applying numerical methods to problems that cannot be solved analytically and ...
Handling multidimensional parabolic linear, nonlinear and linear inverse problems is the main object...