On the existence of Lp-Optimal Transport maps for norms on RN

Abstract

In this paper, we prove existence of Lp-optimal transport maps with p ∈ (1,∞) in a class of branching metric spaces defined on RN. In particular, we introduce the notion of cylinder-like convex function and we prove an existence result for the Monge problem with cost functions of the type c(x, y) = f(g(y - x)), where f: [0, ∞) → [0, ∞) is an increasing strictly convex function and g: RN → [0, ∞) is a cylinder-like convex function. When specialised to cylinder-like norm, our results shows existence of Lp-optimal transport maps for several "branching'" norms, including all norms in R2 and all crystalline norms.

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