The Skorokhod embedding problem for inhomogeneous diffusions

Abstract

We solve the Skorokhod embedding problem for a class of stochastic processes satisfying an inhomogeneous stochastic differential equation (SDE) of the form d At =μ (t, At) d t + σ(t, At) d Wt. We provide sufficient conditions guaranteeing that for a given probability measure on R there exists a bounded stopping time τ and a real a such that the solution (At) of the SDE with initial value a satisfies Aτ . We hereby distinguish the cases where (At) is a solution of the SDE in a weak or strong sense. Our construction of embedding stopping times is based on a solution of a fully coupled forward-backward SDE. We use the so-called method of decoupling fields for verifying that the FBSDE has a unique solution. Finally, we sketch an algorithm for putting our theoretical construction into practice and illustrate it with a numerical experiment.