On absolutely continuous curves in the Wasserstein space over R and their representation by an optimal Markov process

Abstract

Let μ = (μt)t∈R be a 1-parameter family of probability measures on R. In [11] we introduced its ``Markov-quantile''process: a process X= (Xt)t∈R that resembles as much as possible the quantile process attached to μ, among the Markov processesattached to μ, i.e. whose family of marginal laws is μ.In this article we look at the case where μ is absolutely continuous in the Wasserstein space P2(R). Then X is solution of adynamical transport problem with marginals (μt)t. It provides a Markov minimal Lagrangian probabilistic representative of μ, whichis moreover unique among the processes obtained as certain types of limits: limits for the finite dimensional topology of quantileprocesses where the past is made independent of the future conditionally on the present at finitely many times, or limits of processeslinearly interpolating μ.This raises new questions about ways to obtain Markov Lagrangian representatives, and to seek uniqueness properties in thisframework.