Stability of supermartingale optimal transport problems

Abstract

We investigate stability properties of weak supermartingale optimal transport (WSOT) problems on R. For probability measures μ,∈Pr satisfying μ ≤cd (equivalently, S(μ,)≠), we consider supermartingale couplings π=μ(d x)πx(d y) and the weak transport functional \[ VSC(μ,) := ∈fπ∈S(μ,) ∫R C(x,πx)\,μ(d x), \] for some appropriate cost function C:R×Pr. Our first main contribution is an approximation result in adapted Wasserstein distance: under Wr-convergence of marginals (μk,k)(μ,) with μk≤cd k, any π∈S(μ,) can be approximated by πk∈S(μk,k) such that AWr(πk,π)0. As a consequence, we obtain the continuity of the functional (μ,) VSC(μ,), and the monotonicity principle for WSOT.

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