Instability of the ray-monotone selector for W1-optimal transport

Abstract

For the distance cost c(x,y)=|x-y|, the set O(μ,) of W1-optimal plans is generally not a singleton. Under the classical absolute-continuity hypotheses in the Euclidean case, secondary variational selection by the quadratic energy C2 yields the ray-monotone W1-optimal plan. We provide a counterexample to an open problem posed by Santambrogio that concerns the stability of this selector under weak convergence of the marginals. More precisely, we construct a fixed absolutely continuous source μ and absolutely continuous targets n such that γsel(μ,n)γhom, where γhom∈ O(μ,) but γhom≠γsel(μ,). We also identify the narrow Kuratowski limit of the optimal-plan sets O(μ,n), derive the constrained -limit for secondary energies of the form ∫ (|x-y|)\,dγ with ∈ C([0,2]), and deduce a non-commutation result for the additive perturbation c(x,y)=|x-y|+|x-y|2.