Stochastic Target Games and Dynamic Programming via Regularized Viscosity Solutions
Abstract
We study a class of stochastic target games where one player tries to find a strategy such that the state process almost-surely reaches a given target, no matter which action is chosen by the opponent. Our main result is a geometric dynamic programming principle which allows us to characterize the value function as the viscosity solution of a non-linear partial differential equation. Because abstract mea-surable selection arguments cannot be used in this context, the main obstacle is the construction of measurable almost-optimal strategies. We propose a novel approach where smooth supersolutions are used to define almost-optimal strategies of Markovian type, similarly as in ver-ification arguments for classical solutions of Hamilton--Jacobi--Bellman equations. The smooth supersolutions are constructed by an exten-sion of Krylov's method of shaken coefficients. We apply our results to a problem of option pricing under model uncertainty with different interest rates for borrowing and lending.
Cite
@article{arxiv.1307.5606,
title = {Stochastic Target Games and Dynamic Programming via Regularized Viscosity Solutions},
author = {Bruno Bouchard and Marcel Nutz},
journal= {arXiv preprint arXiv:1307.5606},
year = {2015}
}
Comments
To appear in MOR