Quadratic Wasserstein metrics for von Neumann algebras via transport plans

Abstract

We show how one can obtain a class of quadratic Wasserstein metrics, that is to say, Wasserstein metrics of order 2, on the set of faithful normal states of a von Neumann algebra A, via transport plans, rather than through a dynamical approach. Two key points to make this work, are a suitable formulation of the cost of transport arising from Tomita-Takesaki theory and relative tensor products of bimodules (or correspondences in the sense of Connes). The triangle inequality, symmetry and W2(μ,μ)=0 all work quite generally, but to show that W2(μ,)=0 implies μ=, we need to assume that A is finitely generated.