An injective martingale coupling

Abstract

We give an injective martingale coupling; in particular, given measures μ and in convex order on R such that is continuous, we construct a martingale transport such that for each y in the support of the target law there is a unique x in a support of the initial law μ such that (some of) the mass at x is transported to y. Then π has disintegration π(dx,dy) = (dy) δθ(y)(dx) for some function θ. More precisely we construct a martingale coupling π of the measures μ and such that there is a set μ such that μ(μ)=1 and a disintegration (πx)x ∈ μ of π of the form π(dx,dy) = πx(dy) μ(dx) such that, with πx a support of πx, we have \# \ x ∈ μ : y ∈ πx \ ∈ \ 0,1 \ for all y and \ y : \# \ x ∈ μ : y ∈ πx \ = 1 \ = supp(). Moreover, if μ is continuous we may take πx = supp(πx) for each x. However, we cannot also insist that μ = supp (μ).