Generalized Orlicz spaces and Wasserstein distances for convex-concave scale functions

Abstract

Given a strictly increasing, continuous function :++, based on the cost functional ∫X× X(d(x,y))\,d q(x,y), we define the L-Wasserstein distance W(μ,) between probability measures μ, on some metric space (X,d). The function will be assumed to admit a representation =φ as a composition of a convex and a concave function φ and , resp. Besides convex functions and concave functions this includes all C2 functions. For such functions we extend the concept of Orlicz spaces, defining the metric space L(X,m) of measurable functions f: X such that, for instance, d(f,g)1 ∫X(|f(x)-g(x)|)\,dμ(x)1.