Discretization and machine learning approximation of BSDEs with a constraint on the Gains-process-Reference-Cited by-同舟云学术

Discretization and machine learning approximation of BSDEs with a constraint on the Gains-process

Published:2021-01-15 Issue:1 Volume:27 Page:27-55
ISSN:1569-3961
Container-title:Monte Carlo Methods and Applications
language:en
Short-container-title:

Author:

Kharroubi Idris¹,Lim Thomas²,Warin Xavier³

Affiliation:

1. Sorbonne Université , CNRS , Laboratoire de Probabilités, Statistiques et Modélisations (LPSM) , Paris , France

2. ENSIIE , Laboratoire de Mathématiques et Modélisation d’Evry , CNRS UMR 8071 , Evry , France

3. EDF R&D and FiME , Paris , France

Abstract

Abstract We study the approximation of backward stochastic differential equations (BSDEs for short) with a constraint on the gains process. We first discretize the constraint by applying a so-called facelift operator at times of a grid. We show that this discretely constrained BSDE converges to the continuously constrained one as the mesh grid converges to zero. We then focus on the approximation of the discretely constrained BSDE. For that we adopt a machine learning approach. We show that the facelift can be approximated by an optimization problem over a class of neural networks under constraints on the neural network and its derivative. We then derive an algorithm converging to the discretely constrained BSDE as the number of neurons goes to infinity. We end by numerical experiments.

Publisher

Walter de Gruyter GmbH

Subject

Applied Mathematics,Statistics and Probability

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