Add to ORKGWe design an importance sampling scheme for backward stochastic differential equations (BSDEs) that minimizes the conditional variance occurring in least-squares Monte Carlo (LSMC) algorithms. The Radon-Nikodym derivative depends on the solution of BSDE, and therefore it is computed adaptively within the LSMC procedure. To allow robust error estimates w.r.t. the unknown change of measure, we properly randomize the initial value of the forward process. We introduce novel methods to analyze the error: firstly, we establish norm stability results due to the random initialization; secondly, we develop refined concentration-of-measure techniques to capture the variance of reduction. Our theoretical results are supported by numerical experiments
AbstractIn this work we investigate the interplay of almost sure and mean-square stability for linea...
Stochastic optimal control has seen significant recent development, motivated by its success in a pl...
We design a numerical scheme for solving a Dynamic Programming equation with Malliavin weights arisi...
We design an importance sampling scheme for backward stochastic differential equations (BSDEs) that ...
We describe an adaptive importance sampling algorithm for rare events that is based on a dual stocha...
International audienceAdaptive Monte Carlo methods are recent variance reduction techniques. In this...
In this paper we explain how the importance sampling technique can be generalized from simulating ex...
This article deals with the numerical resolution of backward stochastic differential equations. Firs...
This article deals with the numerical resolution of backward stochastic differential equations. Firs...
International audienceWe investigate in this paper an alternative method to simulation based recursi...
International audienceAdaptive Monte Carlo methods are recent variance reduction techniques. In this...
International audienceAdaptive Monte Carlo methods are recent variance reduction techniques. In this...
We study the problem'bfthe numerical solution to BSDEs from a weak approximation viewpoint. The firs...
ABSTRACT We propose an adaptive importance sampling scheme for the simulation of rare events when t...
Maximum likelihood estimation (MLE) of stochastic differential equations (SDEs) is difficult because...
AbstractIn this work we investigate the interplay of almost sure and mean-square stability for linea...
Stochastic optimal control has seen significant recent development, motivated by its success in a pl...
We design a numerical scheme for solving a Dynamic Programming equation with Malliavin weights arisi...
We design an importance sampling scheme for backward stochastic differential equations (BSDEs) that ...
We describe an adaptive importance sampling algorithm for rare events that is based on a dual stocha...
International audienceAdaptive Monte Carlo methods are recent variance reduction techniques. In this...
In this paper we explain how the importance sampling technique can be generalized from simulating ex...
This article deals with the numerical resolution of backward stochastic differential equations. Firs...
This article deals with the numerical resolution of backward stochastic differential equations. Firs...
International audienceWe investigate in this paper an alternative method to simulation based recursi...
International audienceAdaptive Monte Carlo methods are recent variance reduction techniques. In this...
International audienceAdaptive Monte Carlo methods are recent variance reduction techniques. In this...
We study the problem'bfthe numerical solution to BSDEs from a weak approximation viewpoint. The firs...
ABSTRACT We propose an adaptive importance sampling scheme for the simulation of rare events when t...
Maximum likelihood estimation (MLE) of stochastic differential equations (SDEs) is difficult because...
AbstractIn this work we investigate the interplay of almost sure and mean-square stability for linea...
Stochastic optimal control has seen significant recent development, motivated by its success in a pl...
We design a numerical scheme for solving a Dynamic Programming equation with Malliavin weights arisi...