Shadows and Barriers

Abstract

We show an intimate connection between solutions of the Skorokhod Embedding Problem which are given as the first hitting time of a barrier and the concept of shadows in martingale optimal transport. More precisely, we show that a solution τ to the Skorokhod Embedding Problem between μ and is of the form τ = ∈f \t ≥ 0 : (Xt,Bt) ∈ R\ for some increasing process (Xt)t ≥ 0 and a barrier R if and only if there exists a time-change (Tl)l ≥ 0 such that for all l ≥ 0 the equation P[Bτ ∈ · , τ ≥ Tl] = S(P[BTl ∈ · , τ ≥ Tl]) is satisfied, i.e.\ the distribution of Bτ on the event that the Brownian motion is stopped after Tl is the shadow of the distribution of BTl on this event in the terminal distribution . This equivalence allows us to construct new families of barrier solutions that naturally interpolate between two given barrier solutions. We exemplify this by an interpolation between the Root embedding and the left-monotone embedding.